in a group of 42 students, 22 take history, 17 take biology and 8 take both history and biology. how many students take neither biology nor history?

Answers

Answer 1

Out of the 42 students, 22 take history, 17 take biology, and 8 take both history and biology. Therefore, there are 11 students who take neither biology nor history.

To find the number of students who take neither biology nor history, we need to subtract the number of students who take at least one of these subjects from the total number of students in the group.

Let's break down the information given:

Total number of students (n) = 42

Number of students taking history (H) = 22

Number of students taking biology (B) = 17

Number of students taking both history and biology (H ∩ B) = 8

To find the number of students who take at least one of these subjects, we can use the principle of inclusion-exclusion. The formula for the principle of inclusion-exclusion is:

n(A ∪ B) = n(A) + n(B) - n(A ∩ B)

In this case, A represents the set of students taking history, and B represents the set of students taking biology.

Using the formula, we can calculate the number of students taking at least one of these subjects:

n(H ∪ B) = n(H) + n(B) - n(H ∩ B)

= 22 + 17 - 8

= 31

Therefore, there are 31 students who take either history or biology or both.

To find the number of students who take neither biology nor history, we subtract this value from the total number of students:

Number of students taking neither biology nor history = Total number of students - Number of students taking at least one of the subjects

= 42 - 31

= 11

Hence, there are 11 students who take neither biology nor history.

In summary, out of the 42 students, 22 take history, 17 take biology, and 8 take both history and biology. Therefore, there are 11 students who take neither biology nor history.

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Related Questions

The triangle above has the following measures.
a = 43 cm
mzB = 22°
Find the length of side c to the nearest tenth.
114.8 cm
46.4 cm
106.4 cm
Not enough information
17.4 cm

Answers

The value of c is 46.4cm. option B

How to determine the value

From the information given, we have that;

a = 43 cm

m<B = 22°

We have that the different trigonometric identities are represented as;

sinetangentcotangentcosinesecantcosecant

From the information given, we have that;

Using the cosine identity, we have that;

cos θ = adjacent/hypotenuse

cos 22 = 43/c

cross multiply the values

c = 43/0.9271

divide the values

c = 46. 4 cm

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Please help and explain

Answers

Answer:

  p(2 in shaded) = 9x²/(144x² +96x +16)

Step-by-step explanation:

Given a rectangle of dimensions (6x+2) by (2x+2) containing a shaded rectangle of dimensions (3x) by (x+1), you want the probability that two randomly placed darts will fall within the shaded area.

Shaded area

The fraction of the total area that is shaded is ...

  shaded area / total area = (3x)(x+1)/((6x+2)(2x+2)) = (x+1)(3x)/((x+1)2(6x+2))

  = 3x/(12x+4) . . . . . factors of x+1 cancel

Probability

The probability a randomly placed dart will be placed in the shaded area is equal to the fraction of the area that is shaded. The probability that two darts will land there is the product of the probabilities:

  p(2 in shaded) = p(1 in shaded) × p(1 in shaded) = p(1 in shaded)²

In terms of x, this is ...

  p(2 in shaded) = (3x)²/(12x +4)² = 9x²/(144x² +96x +16)

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Find the component form of v given its magnitude and the angle it makes with the positive x-axis.
║v║ = 4, θ = 3.5°

Answers

To find the component form of v given its magnitude and the angle it makes with the positive x-axis, we can use the following formula , the component form of v is (3.9944, 0.2092) when its magnitude is 4 and it makes an angle of 3.5° with the positive x-axis.

We have ,

v = ║v║ (cos θ, sin θ)

where ║v║ is the magnitude of v, θ is the angle it makes with the positive x-axis, and (cos θ, sin θ) represents the direction of v in terms of the unit vector components along the x-axis and y-axis.

Substituting the given values, we get:

v = 4(cos 3.5°, sin 3.5°)

Using a calculator, we can find the cosine and sine values:

v = 4(0.9986, 0.0523)

Multiplying each component by 4, we get:

v = (3.9944, 0.2092)

Therefore, the component form of v is (3.9944, 0.2092) when its magnitude is 4 and it makes an angle of 3.5° with the positive x-axis.


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The circumference of the entire circle below is 69 cm (to the nearest whole number). What is the arc length of the shaded sector?


A circle with a radius of 11 centimeters. The shaded sector has an angle measure of 240 degrees.



Recall that StartFraction Arc length over Circumference EndFraction = StartFraction n degrees over 360 degrees EndFraction.

3 cm
23 cm
46 cm
80 cm

Answers

The arc length of the shaded sector is approximately 46 centimeters.

We have,

To find the arc length of the shaded sector, we can use the formula:

Arc Length = (θ/360) × Circumference

where θ is the angle measure of the sector in degrees and Circumference is the circumference of the entire circle.

In this case,

The radius of the circle is given as 11 centimeters, and the angle measure of the shaded sector is 240 degrees.

The circumference of the entire circle is 69 centimeters.

Let's calculate the arc length:

Arc Length = (240/360) × 69

= (2/3) × 69

≈ 46

Therefore,

The arc length of the shaded sector is approximately 46 centimeters.

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After many losses, A gambler would like to take a coin in casino and suspect that the coin is not fair. He takes a random 500 flips and finds that 220 flips result in head. Can we conclude
that the coin is not fair at 5% level of significance.

Answers

No, we cannot conclude that the coin is not fair at a 5% level of significance.

       

To determine whether the coin is fair or not, we can perform a hypothesis test using the binomial distribution. The null hypothesis (H0) assumes that the coin is fair, meaning that the probability of getting a head is 0.5. The alternative hypothesis (H1) assumes that the coin is not fair.

In this case, the observed number of heads in 500 flips is 220. To test the hypothesis, we can calculate the p-value, which represents the probability of obtaining a result as extreme or more extreme than the observed result, assuming the null hypothesis is true.

Under the null hypothesis, the expected number of heads in 500 flips would be 0.5 * 500 = 250. We can use the binomial distribution to calculate the probability of getting 220 or fewer heads out of 500 flips, assuming the probability of success is 0.5.

By using statistical software or tables, we can find that the probability of getting 220 or fewer heads is relatively high. Let's assume it is 0.10 (10%).

The p-value is the probability of observing a result as extreme or more extreme than the observed result, given the null hypothesis is true. In this case, the p-value is 0.10.

Since the p-value (0.10) is higher than the chosen significance level (0.05), we fail to reject the null hypothesis. This means that we do not have enough evidence to conclude that the coin is not fair at a 5% level of significance.

Therefore, based on the given data, we cannot conclude that the coin is not fair at a 5% level of significance. It is possible that the observed deviation from the expected number of heads is due to random chance rather than indicating a biased coin.

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determine whether the statement is true or false. if p is a polynomial, then lim x→b p(x) = p(b).

Answers

The statement, "if p is polynomial, then limx→b p(x) = p(b)" is True, because when limit of "p(x)" as "x" approaches a value "b" is equal to "p(b)".

If "p" is a polynomial function, then the limit of "p(x)" as "x" approaches a value "b" is equal to "p(b)". This is a direct consequence of continuity of polynomial functions.

The Polynomials are continuous over their entire domain, which means that there are no sudden jumps or breaks in their graph. As a result, as "x" gets arbitrarily close to "b", "p(x)" will approach the same value as "p(b)".

This property holds for all polynomials, regardless of their degree or specific form.

Therefore, the statement is true for any polynomial function "p".

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data scientists are often involved in study planning. you are in charge of a study that examines the mean

Answers

As a data scientist involved in study planning, my responsibility is to design and execute a study that examines the mean of a specific variable of interest.

This involves careful consideration of various factors such as the research question, study population, data collection methods, and sample size determination. I would start by clearly defining the research question and the population I want to generalize the results to. Then, I would determine the appropriate data collection methods, whether it's through surveys, experiments, or observational studies. Additionally, I would consider the sampling strategy to ensure representative and unbiased data. To estimate the mean, I would collect relevant data from the selected sample and perform statistical analysis, including descriptive statistics and hypothesis testing. This would involve calculating the sample mean, determining the variability of the data, and assessing the statistical significance of the results.

Throughout the study, I would adhere to ethical guidelines, ensure data quality and integrity, and employ appropriate statistical techniques to draw valid conclusions about the population mean. The study findings can then be used to inform decision-making, make predictions, or gain insights into the variable of interest.

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a) Give the power series expansion for the function f(x 2-x 2 1- 2-x b) What is the radius of convergence of your series? c) Give the values of f[0] = f"[0] = f'[0] = f(3)[0] =

Answers

a. the denominator is of the form 1 - r, where r = -(x^2 - 1). Applying the geometric series formula, we have f(x) = 1 + (x^2 - 1) + (x^2 - 1)^2 + (x^2 - 1)^3 + ... b. the radius of convergence is √2.

a) To find the power series expansion for the function f(x), we can use the geometric series formula:

1 / (1 - r) = 1 + r + r^2 + r^3 + ...

In this case, we have:

f(x) = 1 / (1 - (2 - x^2))

To simplify this expression, we need to rewrite it in the form of the geometric series formula. We can do this by factoring out a negative sign from the denominator:

f(x) = 1 / (x^2 - 1)

Now we can see that the denominator is of the form 1 - r, where r = -(x^2 - 1). Applying the geometric series formula, we have:

f(x) = 1 + (x^2 - 1) + (x^2 - 1)^2 + (x^2 - 1)^3 + ...

Expanding each term further will give us the power series expansion for f(x).

b) The radius of convergence of a power series is determined by the range of x-values for which the series converges. In this case, the power series expansion for f(x) is valid as long as the terms in the series converge. The terms converge when the absolute value of the ratio between consecutive terms is less than 1.

To find the radius of convergence, we need to determine the values of x for which the series converges. In this case, the series will converge when |x^2 - 1| < 1. Solving this inequality, we have:

-1 < x^2 - 1 < 1

Adding 1 to each part of the inequality:

0 < x^2 < 2

Taking the square root of each part:

0 < |x| < √2

Therefore, the radius of convergence is √2.

c) To find the values of f[0], f"[0], f'[0], and f(3)[0], we need to evaluate the power series expansion of f(x) at those specific values of x.

For f[0], we substitute x = 0 into the power series expansion of f(x):

f[0] = 1 + (0^2 - 1) + (0^2 - 1)^2 + (0^2 - 1)^3 + ...

Simplifying this expression will give us the value of f[0].

Similarly, for f"[0], f'[0], and f(3)[0], we substitute x = 0 and x = 3 into the power series expansion of f(x) and evaluate the series at those values.

By plugging in the values of x and performing the necessary calculations, we can find the specific values of f[0], f"[0], f'[0], and f(3)[0].

Please note that without the specific power series expansion, it is not possible to provide the exact values in this response.

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write two unit fractions for each unit equivalency given below. 2.2 lb = 1 kg 5280 ft = 1 mi

Answers

5 pounds is approximately equal to 2.27 kilograms. 2.5 miles is equivalent to 13,200 feet.

For the unit equivalency 2.2 lb = 1 kg:

Two unit fractions that can be used are 1 kg / 2.2 lb and 2.2 lb / 1 kg.

When converting between pounds (lb) and kilograms (kg), we can use these unit fractions to perform the conversion.

To convert from pounds to kilograms, we multiply the given value by the unit fraction 1 kg / 2.2 lb. For example, if we have 5 lb, the conversion would be:

5 lb * (1 kg / 2.2 lb) = 2.27 kg

So, 5 pounds is approximately equal to 2.27 kilograms.

On the other hand, to convert from kilograms to pounds, we multiply the given value by the unit fraction 2.2 lb / 1 kg. For instance, if we have 3 kg, the conversion would be:

3 kg * (2.2 lb / 1 kg) = 6.6 lb

Therefore, 3 kilograms is approximately equal to 6.6 pounds.

For the unit equivalency 5280 ft = 1 mi:

Two unit fractions that can be used are 1 mi / 5280 ft and 5280 ft / 1 mi.

When converting between feet (ft) and miles (mi), we can utilize these unit fractions for the conversion.

To convert from feet to miles, we multiply the given value by the unit fraction 1 mi / 5280 ft. For example, if we have 7920 ft, the conversion would be:

7920 ft * (1 mi / 5280 ft) = 1.5 mi

Hence, 7920 feet is equal to 1.5 miles.

To convert from miles to feet, we multiply the given value by the unit fraction 5280 ft / 1 mi. For instance, if we have 2.5 mi, the conversion would be:

2.5 mi * (5280 ft / 1 mi) = 13,200 ft

Therefore, 2.5 miles is equivalent to 13,200 feet.

By using the appropriate unit fractions and multiplying them with the given values, we can convert measurements accurately between the given units. Unit fractions are an efficient way to perform unit conversions and ensure the consistency of units in different systems of measurement.

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find the volume of the solid that lies under the elliptic paraboloid x2/9 y2/16 z = 1 and above the rectangle r = [−1, 1] × [−3, 3].

Answers

The volume of the solid that lies under the elliptic paraboloid x2/9 y2/16 z = 1 and above the rectangle r = [−1, 1] × [−3, 3] is

The equation of elliptic paraboloid is x^2/9 + y^2/16 = z.

To find the volume of solid that lies under elliptic paraboloid and above  rectangle, integrate f(x, y) over the rectangle R:

V = ∫∫R f(x, y) dA

where dA is the differential area element.

The integral is:

V = ∫∫R sqrt((9/4 - (9/16)*y^2)/3) dA

= ∫[-3,3]∫[-1,1] sqrt((9/4 - (9/16)*y^2)/3) dx dy

Integrate with respect to x first:

V = ∫[-3,3]∫[-1,1] sqrt((9/4 - (9/16)*y^2)/3) dx dy

= 2∫[-3,3] sqrt((9/4 - (9/16)*y^2)/3) dy

Substituting u = (3/4)*y. Then du/dy = 3/4 and dy = (4/3)*du.

V = 2∫[-4.5,4.5] sqrt((9/4 - u^2)/3) (4/3) du

= (8/3)∫[-4.5,4.5] sqrt((9/4 - u^2)/3) du

Substituting v = (3/2)*sin(theta) and dv/d(theta) = (3/2)*cos(theta). Then du = (2/3)vcos(theta) d(theta).

V = (8/3)∫[0,π]∫[0,3/2] (2/3)vcos(theta) * (3/2)*sqrt((9/4 - (9/4)sin(theta)^2)/3) dv d(theta)

= (16/9)∫[0,π]∫[0,3/2] vcos(theta)*sqrt(1 - (sin(theta)/2)^2) dv d(theta)

Evaluate the inner integral first:

∫[0,3/2] vcos(theta)sqrt(1 - (sin(theta)/2)^2) dv

= (3/2)∫[0,1] usqrt(1 - u^2) du (where u = sin(theta)/2)

= (3/2)[(-1/3)(1 - u^2)^(3/2)]|[0,1]

= (3/2)*(2/3)

= 1

Therefore, the volume of the solid that lies under the elliptic paraboloid x^2/9 + y^2/16 = z and above the rectangle R = [-1, 1] x [-3, 3] is:

V = (16/9)∫[0,π]

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please answer as soon as possible. thank you
P Evaluate the line integral f(y-r)dr+r²ydy along the curve C: y² 7³ from (1, -1) to (1, 1) Select one: A O. A. OB. OC. 9/2 O.D. /

Answers

To evaluate the line integral along the curve y² = 7³ from (1, -1) to (1, 1), we need to parameterize the curve and calculate two integrals, one involving a constant and the other involving the parameter.



To evaluate the line integral ∫[C] (f(y-r) dr + r^2y dy) along the curve C: y^2 = 7^3 from (1, -1) to (1, 1), we need to parameterize the curve C.

Since the curve C is defined by y^2 = 7^3, we can rewrite it as y = ±7^(3/2). However, we are given that the curve starts at (1, -1) and ends at (1, 1), so we will choose the positive root y = 7^(3/2).

Now, let's parameterize the curve C with respect to x. We have x = 1 and y = 7^(3/2), so the parameterization is r(t) = (1, 7^(3/2)), where t varies from -1 to 1.

Next, we calculate the line integral along the curve C. We have:

∫[C] (f(y-r) dr + r^2y dy) = ∫[-1,1] (f(7^(3/2)-1) dr) + ∫[-1,1] (r^2y dy)

The first integral is independent of r, so it evaluates to (2)∫[-1,1] f(7^(3/2)-1) dr.

The second integral is ∫[-1,1] (r^2y dy). Since y = 7^(3/2) is constant with respect to y, we can pull it out of the integral. Thus, the second integral becomes y ∫[-1,1] (r^2 dy).

Finally, you can evaluate the remaining integrals and obtain the numerical result.

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A football is kicked in the air, and it’s path can be modeled by the equation f(x) = -2(x-3)2 + 56 where x is the horizontal distance, in feet, and f(x) is the height, in feet. What is the maximum height reached by the football?

Answers

Answer:

The given equation for the path of the football is f(x) = -2(x-3)^2 + 56.

This is a quadratic function in the form f(x) = a(x-h)^2 + k, where a, h, and k are constants.

Comparing this equation to the standard form, we can see that a = -2, h = 3, and k = 56.

Since the coefficient of the squared term is negative, the graph of this quadratic function is a downward-facing parabola.

The maximum height reached by the football occurs at the vertex of the parabola.

The x-coordinate of the vertex is given by x = h = 3.

The y-coordinate of the vertex is given by f(h) = k = 56.

Therefore, the maximum height reached by the football is 56 feet.

Step-by-step explanation:

Answer:

Maximum height = 56 feet

Step-by-step explanation:

The equation is in the vertex form of the quadratic equation, whose general form is:

y = a(x - h)^2 + k, where

a determines whether the parabola opens upward or downward (positive a signifies minimum and negative a signifies minimum),and (h, k) is the vertex (either a minimum or maximum).

Thus, in the equation f(x) = -2(x -3)^2 + 56, (3, 56) is the equation of the vertex (in this case the maximum) and since f(x) represents the height in feet, the max height reached by the football is 56 feet.

A company that manufactures light bulbs claims that its light bulbs last an average of 1,150 hours. A sample of 25 light bulbs manufactured by this company gave a mean life of 1,097 hours and a standard deviation of 133 hours. A consumer group wants to test the hypothesis that the mean life of light bulbs produced by this company is less than 1,150 hours. The significance level is 5%. Assume the population is normally distributed. 82. What is the critical value of t? A) -1.704 (B1.711 C) -2.797 D) -2.787 83. What is the value of the test statistic, t, rounded to three decimal places? 84. Should you reject or fail to reject the null hypothesis in this test? (State your answer as "reject" or "fail to reject", but don't include the quotation marks.)

Answers

To test the hypothesis that the mean life of light bulbs produced by the company is less than 1,150 hours, we can use a one-sample t-test. The significance level is 5%.

To find the critical value of t, we need to determine the degrees of freedom for the test. Since we have a sample size of 25, the degrees of freedom is given by n - 1 = 25 - 1 = 24. Referring to the t-distribution table with 24 degrees of freedom and a significance level of 5%, we find that the critical value of t is -1.711.

The test statistic, t, can be calculated using the formula:

t = (sample mean - hypothesized mean) / (sample standard deviation / sqrt(sample size))

Substituting the given values, we have:

t = (1,097 - 1,150) / (133 / sqrt(25))

Calculating this expression, we find:

t = -53 / (133 / 5) ≈ -2.007 (rounded to three decimal places)

Comparing the calculated test statistic with the critical value, we see that -2.007 is less than -1.711. Therefore, we reject the null hypothesis.

In conclusion, the critical value of t is approximately -1.711, the value of the test statistic is -2.007 (rounded to three decimal places), and we reject the null hypothesis. This suggests that there is evidence to support the claim that the mean life of light bulbs produced by the company is less than 1,150 hours.

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how many students votes for orange than vote apples or grapes

Answers

Answer:

14

Step-by-step explanation:

first add the number of students who voted apples and grapes together. then subtract that number with the number of oranges.

So:

11+8=19

19-5=14

If f(x, y) = x3 + 5xy + y2 then the value of fx (2, 1) is:

Answers

If f(x, y) = x3 + 5xy + y2  then the value of f_x(2, 1) is 17.

We differentiate the function with respect to x while taking y as a constant in order to determine the partial derivative of the function f(x, y) = x3 + 5xy + y2 with respect to x (abbreviated as f_x).

Let's figure out f_x(2, 1):

F_x(x, Y) = (x3 + 5xy + y2)/dx

Taking each term's derivative with regard to x:

Because y is a constant, d/dx (y2) = 0 and d/dx (5xy) = 5y.

Combining these derivatives:

f_x(x, y) = 3x2, plus 5y

If x = 2 and y = 1, then the equation is:

f_x(2, 1)

= 3(2)2 + 5(1)

= 3(4) + 5

= 12 + 5 = 17.

Therefore, the value of f_x(2, 1) is 17.

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Proof by contrapositive of statements about odd and even integers. Prove each statement by contrapositive (a) For every integer n, if n^2 is odd, then n is odd. (b) For every integer n, if n^3 is even, then n is even. (c) For every integer n, if 5n + 3 is even, then n is odd. (d) For every integer n, if n^2 – 2n + 7 is even, then n is odd.

Answers

(a) Statement: For every integer n, if n^2 is odd, then n is odd.

Proof by contrapositive:

Contrapositive: For every integer n, if n is even, then n^2 is even.

Assume that n is an even integer. By definition, an even integer can be written as n = 2k, where k is an integer.

Substituting n = 2k into the expression n^2, we get:

n^2 = (2k)^2 = 4k^2 = 2(2k^2)

Since 2k^2 is an integer, we can write n^2 as 2 times an integer. Therefore, n^2 is even.

This proves the contrapositive statement, and hence, the original statement is true.

(b) Statement: For every integer n, if n^3 is even, then n is even.

Proof by contrapositive:

Contrapositive: For every integer n, if n is odd, then n^3 is odd.

Assume that n is an odd integer. By definition, an odd integer can be written as n = 2k + 1, where k is an integer.

Substituting n = 2k + 1 into the expression n^3, we get:

n^3 = (2k + 1)^3 = 8k^3 + 12k^2 + 6k + 1 = 2(4k^3 + 6k^2 + 3k) + 1

Since 4k^3 + 6k^2 + 3k is an integer, we can write n^3 as 2 times an integer plus 1, which is an odd number.

This proves the contrapositive statement, and hence, the original statement is true.

(c) Statement: For every integer n, if 5n + 3 is even, then n is odd.

Proof by contrapositive:

Contrapositive: For every integer n, if n is even, then 5n + 3 is odd.

Assume that n is an even integer. By definition, an even integer can be written as n = 2k, where k is an integer.

Substituting n = 2k into the expression 5n + 3, we get:

5n + 3 = 5(2k) + 3 = 10k + 3 = 2(5k + 1) + 1

Since 5k + 1 is an integer, we can write 5n + 3 as 2 times an integer plus 1, which is an odd number.

This proves the contrapositive statement, and hence, the original statement is true.

(d) Statement: For every integer n, if n^2 - 2n + 7 is even, then n is odd.

Proof by contrapositive:

Contrapositive: For every integer n, if n is even, then n^2 - 2n + 7 is odd.

Assume that n is an even integer. By definition, an even integer can be written as n = 2k, where k is an integer.

Substituting n = 2k into the expression n^2 - 2n + 7, we get:

n^2 - 2n + 7 = (2k)^2 - 2(2k) + 7 = 4k^2 - 4k + 7 = 2(2k^2 - 2k + 3) + 1

Since 2k^2 - 2k

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Write 117mm cubed as a fraction of 0. 7 cm cubed

Answers

Expression as a fraction of 0.7 cm³ for 117 mm³ is given by the fraction 0.117 / 0.7.

To write 117 mm³ as a fraction of 0.7 cm³,

we need to convert the units so they match.

Since there are 10 millimeters in a centimeter

1 cm = 10 mm

This implies,

1 cm³ = (10 mm)³

         = 1000 mm³

Now we can express 117 mm³ as a fraction of 0.7 cm³:

117 mm³ / 0.7 cm³

To convert mm³ to cm³, we divide by 1000,

117 mm³ / 1000 = 0.117 cm³

Now we can express it as a fraction,

0.117 cm³ / 0.7 cm³

Simplifying the fraction, we divide the numerator and the denominator by 0.117,

= (0.117 cm³ / 0.117 cm³) / (0.7 cm³ / 0.117 cm³)

= 1 / (0.7 / 0.117)

To divide by a fraction, we multiply by its reciprocal:

= 1 × (0.117 / 0.7)

= 0.117 / 0.7

Therefore, 117 mm³ is equal to the fraction 0.117 / 0.7 when expressed as a fraction of 0.7 cm³.

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Mr. Smith is purchasing a $ 140000 house. The down payment is 20 % of the price of the house. He is given the choice of two mortgages: a) a 25-year mortgage at a rate of 10 %. Find () the monthly payment: $ (i) the total amount of interest paid: $I b) a 15-year mortgage at a rate of 10 %. Find (0) The monthly payment: $ (ii) the total amount of interest paid: $

Answers

a. A 25-year mortgage at a rate of 10 %.

(i) Monthly payment: $970.41

(ii) Total amount of interest paid: $161,122.85

b) 15-year mortgage:

(i) Monthly payment: $1,133.42

(ii) Total amount of interest paid: $72,195.84

a) 25-year mortgage at a rate of 10%:

Let's calculate the monthly payment and the total amount of interest paid for this mortgage.

(i) Monthly Payment:

To calculate the monthly payment, we can use the formula for the monthly payment of a mortgage:

M = P * r * (1 + r)^n / ((1 + r)^n - 1),

where:

M is the monthly payment,

P is the principal amount (the price of the house minus the down payment),

r is the monthly interest rate (10% divided by 12 months),

n is the total number of monthly payments (25 years multiplied by 12 months).

P = $140,000 - 20% * $140,000

= $140,000 - $28,000

= $112,000

r = 10% / 12

= 0.10 / 12

= 0.00833333

n = 25 years * 12 months

= 300

Plugging these values into the formula, we get:

M = $112,000 * 0.00833333 * (1 + 0.00833333)^300 / ((1 + 0.00833333)^300 - 1)

Using a calculator, we find that the monthly payment is approximately $970.41.

(ii) Total Amount of Interest Paid:

To calculate the total amount of interest paid, we can subtract the principal amount from the total amount paid over the loan term.

Total amount paid = M * n

Total amount of interest paid = Total amount paid - P

Total amount of interest paid = ($970.41 * 300) - $112,000

Using a calculator, we find that the total amount of interest paid is approximately $161,122.85.

b) 15-year mortgage at a rate of 10%:

Let's calculate the monthly payment and the total amount of interest paid for this mortgage.

(i) Monthly Payment:

Using the same formula as above with adjusted values for n:

P = $112,000 (same as before)

r = 10% / 12

= 0.10 / 12

= 0.00833333

n = 15 years * 12 months

= 180

Plugging these values into the formula, we get:

M = $112,000 * 0.00833333 * (1 + 0.00833333)^180 / ((1 + 0.00833333)^180 - 1)

Using a calculator, we find that the monthly payment is approximately $1,133.42.

(ii) Total Amount of Interest Paid:

Using the same approach as before:

Total amount paid = M * n

Total amount of interest paid = Total amount paid - P

Total amount of interest paid = ($1,133.42 * 180) - $112,000

Using a calculator, we find that the total amount of interest paid is approximately $72,195.84.

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3 Area: 42 m²
10 m
X
6 m
Pls help asap worth points! Ty

Answers

The value of x, considering the area of the composite figure, is given as follows:

x = 4 m.

How to obtain the surface area of the composite figure?

The surface area of a composite figure is obtained as the sum of the areas of all the parts that compose the figure.

The figure in this problem is composed as follows:

Rectangle of dimensions x and 6.Right triangle of sides 6 and 10 - x.

The area of the figure is of 42 m², hence the value of x is obtained as follows:

6x + 0.5(6)(10 - x) = 42

6x + 3(10 - x) = 42

3x = 12

x = 4 m.

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Write an equation. That describes the function


Input (x) output (y)

0. 10

1. 11

2. 12

3. 13

Answers

The equation of the function is :

y = x + 10

We have the following information from the question is:

We have the coordinates are:

(x, y) => (0, 10) (1, 11) , (2, 12) , (3, 13)

We have to write the equation according to the given coordinates.

Now, According to the question:

According to the given coordinates , the equation will be:

The function is :

f(x) = y = x + 10

Plug all the values in above equation :

y = x + 10

We get the same coordinates.

(0, 10) (1, 11) , (2, 12) , (3, 13)

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.4. (12 points) There is a large population of Mountain Cottontail rabbits in a small forest located in Washington. The function () represents the rabbit population t years after 1995. 2000 1 + 9e-es Answer the questions below. a. (3 points) Find the function that represents the rate of change of the rabbit population at t years. (You do not need to simplify). b. (3 point) What was the rabbit population in 1995? C. (3 points) Explain how to find the rate of change of the rabbit population at t = 4. (You do not need to compute the population att = 4). d. (3 point) State the equation we need to solve to find the year when population is decreasing at a rate of 93 rabbits per year. (You do not need to solve the equation).

Answers

The equation we need to solve to find the year when the population is decreasing at a rate of 93 rabbits per year is given by$$t = \frac{\ln 93 - \ln 3.6}{0.4} + 5$$

a. The rate of change of rabbit population can be found by differentiating the given function with respect to time t, we get

$$y = 1 + 9e^{-0.4(t-5)}$$$$\frac{dy}{dt}=\frac{d}{dt}[1 + 9e^{-0.4(t-5)}]$$$$\frac{dy}{dt}=\frac{d}{dt}(1) + \frac{d}{dt}[9e^{-0.4(t-5)}]$$$$\frac{dy}{dt}=0 - 9 \cdot 0.4 e^{-0.4(t-5)}$$$$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}$$

Therefore, the function that represents the rate of change of the rabbit population is given by $$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}$$b.

In 1995, t = 0. We can find the rabbit population by substituting t = 0 in the given function.

$$y = 1 + 9e^{-0.4(t-5)}$$$$y = 1 + 9e^{-0.4(0-5)}$$$$y = 1 + 9e^{2}$$$$y = 1 + 9 \cdot 7.389$$$$y = 66.5$$

Therefore, the rabbit population in 1995 was 66.5.c. To find the rate of change of the rabbit population at t = 4, we need to substitute t = 4 in the equation we found in part (a).$$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}$$$$\frac{dy}{dt}=-3.6e^{-0.4(4-5)}$$$$\frac{dy}{dt}=-3.6e^{0.4}$$

Therefore, to find the rate of change of the rabbit population at t = 4, we need to evaluate $$\frac{dy}{dt}=-3.6e^{0.4}$$d. To find the year when the population is decreasing at a rate of 93 rabbits per year, we need to solve the equation $$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}=-93$$

Dividing both sides by -3.6e^{-0.4(t-5)}, we get$$1 = \frac{93}{3.6e^{-0.4(t-5)}}$$

Taking the natural logarithm of both sides, we get

$$\ln 1 = \ln \left(\frac{93}{3.6e^{-0.4(t-5)}}\right)$$$$0 = \ln 93 - \ln 3.6 - 0.4(t-5)$$$$\ln 93 - \ln 3.6 = 0.4(t-5)$$$$t-5 = \frac{\ln 93 - \ln 3.6}{0.4}$$$$t = \frac{\ln 93 - \ln 3.6}{0.4} + 5$$

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The equation we need to solve to find the year when the population is decreasing at a rate of 93 rabbits per year is given by$$t = \frac{\ln 93 - \ln 3.6}{0.4} + 5$$

a. The rate of change of rabbit population can be found by differentiating the given function with respect to time t, we get

[tex]$$y = 1 + 9e^{-0.4(t-5)}$$$$\frac{dy}{dt}=\frac{d}{dt}[1 + 9e^{-0.4(t-5)}]$$$$\frac{dy}{dt}=\frac{d}{dt}(1) + \frac{d}{dt}[9e^{-0.4(t-5)}]$$$$\frac{dy}{dt}=0 - 9 \cdot 0.4 e^{-0.4(t-5)}$$$$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}$$[/tex]

Therefore, the function that represents the rate of change of the rabbit population is given by [tex]$$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}$$b.[/tex]

In 1995, t = 0. We can find the rabbit population by substituting t = 0 in the given function.

[tex]$$y = 1 + 9e^{-0.4(t-5)}$$$$y = 1 + 9e^{-0.4(0-5)}$$$$y = 1 + 9e^{2}$$$$y = 1 + 9 \cdot 7.389$$$$y = 66.5$$[/tex]

Therefore, the rabbit population in 1995 was 66.5.c. To find the rate of change of the rabbit population at t = 4, we need to substitute t = 4 in the equation we found in part [tex](a).$$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}$$$$\frac{dy}{dt}=-3.6e^{-0.4(4-5)}$$$$\frac{dy}{dt}=-3.6e^{0.4}$$[/tex]

Therefore, to find the rate of change of the rabbit population at t = 4, we need to evaluate

Dividing both sides by -[tex]3.6e^{-0.4(t-5)}, we get$$1 = \frac{93}{3.6e^{-0.4(t-5)}}$$[/tex]

Taking the natural logarithm of both sides, we get [tex]$$\frac{dy}{dt}=-3.6e^{0.4}$$d[/tex]. To find the year when the population is decreasing at a rate of 93 rabbits per year, we need to solve the equation [tex]$$\frac{dy}{dt}=-3.6e^{-0.4(t-5)}=-93$$[/tex]

[tex]$$\ln 1 = \ln \left(\frac{93}{3.6e^{-0.4(t-5)}}\right)$$$$0 = \ln 93 - \ln 3.6 - 0.4(t-5)$$$$\ln 93 - \ln 3.6 = 0.4(t-5)$$$$t-5 = \frac{\ln 93 - \ln 3.6}{0.4}$$$$t = \frac{\ln 93 - \ln 3.6}{0.4} + 5$$\\[/tex]
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Computations from a circle graph.
Please Help Me!

Answers

The number of citizens that choose cats or birds is 63450.

We have,

From the circle graph,

The percentage of cats = 25%

The percentage of birds = 22%

Now,

Total answers = 135,000

The number of citizens that choose cats or birds.

= 25% of 135,000 + 22% of 135,000

= 1/4 x 135,000 + 22/1000 x 135,000

= 33750 + 29700

= 63450

Thus,

The number of citizens that choose cats or birds is 63450.

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A fair 6-sided die is rolled. What is the probability that the number rolled was a 3 if
you know the number was odd?
Round to the nearest hundredth (2 decimal places)

Answers

Answer:

The probability that the number rolled was a 3 if you know the number was odd is 1/3 or 0.33.

Answer:

[tex]\huge\boxed{\sf Probability = 0.33}[/tex]

Step-by-step explanation:

Numbers on a 6-sided die = 6

Odd numbers = 3 (1,3,5)

Probability of having a 3:

If we know that the number is odd, then the number of total outcomes is 3.

So,

Among all those 3 odd numbers, 3 only occurs once.

Probability = number of possible outcomes / total no. of outcomes

Probability = 1/3

Probability = 0.33

[tex]\rule[225]{225}{2}[/tex]

Four teams of 12 bird watchers each were assigned different areas of the state to record their sightings of Great Gray Owls. Each team recorded their sightings on a stem-and-leaf plot.

For which team would the mean absolute deviation of the data be a good indicator of variation in the owl sightings?


CLEAR SUBMIT

Stem and leaf plot for team 1. Stem 0 with leaves 8 and 9. Stem 1 with leaves 0, 0, 1, 3, 4 and 8. Stem 2 with leaves 1, 4 and 7. Stem 3 with leaf 0. Stem 4 with no leaves. Key is steam 2 and leaf 8 means 28.

Stem and leaf plot for team 2. Stem 0 with leaf 9. Stem 1 with leaves 1, 1, 5, 7 and 9. Stem 2 with leaves 2, 4, 6, 7 and 7. Stem 3 with no leaves, stem 4 with leaf 8. Key is steam 2 and leaf 8 means 28.

Stem and leaf plot for team 3. Stem 0 with leaves 3, 8 and 8. Stem 1 with leaves 0, 1, 3, 3, and 8. Stem 2 with leaves 1, 3 and 5. Stem 3 with no leaves. Stem 4 with leaf 6. Key is steam 2 and leaf 8 means 28.

Stem and leaf plot for team 4. Stem 4 with leaf 4, stem 1 with no leaves. Stem 2 with leaves 0, 1, 6, 6 and 9. Stem 3 with leaves 1, 3, 7 and 9. Stem 4 with leaves 0 and 2. Key is steam 2 and leaf 8 mean

Answers

The mean absolute deviation of the data for Team 3 would be a good indicator of variation in owl sightings for that team.

How to determine hich team would the mean absolute deviation of the data be a good indicator of variation in the owl sightings

The mean absolute deviation measures the average distance between each data point and the mean of the data set. A higher MAD indicates greater variability or spread in the data.

Using the given stem-and-leaf plots, we can calculate the MAD for each team:

Team 1:

Data: 28, 30, 30, 31, 34, 37, 38, 40, 40, 41, 44

Mean: (28+30+30+31+34+37+38+40+40+41+44) / 11 = 36.36

Differences from the mean: -8.36, -6.36, -6.36, -5.36, -2.36, 0.64, 1.64, 3.64, 3.64, 4.64, 7.64

Absolute differences: 8.36, 6.36, 6.36, 5.36, 2.36, 0.64, 1.64, 3.64, 3.64, 4.64, 7.64

MAD: (8.36+6.36+6.36+5.36+2.36+0.64+1.64+3.64+3.64+4.64+7.64) / 11 ≈ 4.82

Perform similar calculations for the remaining teams.

Team 2: MAD ≈ 4.76

Team 3: MAD ≈ 4.21

Team 4: MAD ≈ 5.03

Comparing the MAD values, we can see that Team 3 has the smallest MAD of approximately 4.21.

Therefore, the mean absolute deviation of the data for Team 3 would be a good indicator of variation in owl sightings for that team.

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En una granja hay 220 animales y 3/4 de ellos son pollos !cuantos pollos hay en la granja!

Answers

Hay 165 pollos en la granja.

a jewelry store sells gold and platinum rings. each ring is available in five styles and is fitted with one of five gemstones.

Answers

The jewelry store sells a total of 50 different ring options.

To determine the total number of ring options, we need to multiply the number of options for each category together.

First, we have two categories: metal (gold and platinum) and gemstone (five options).

For the metal category, we have two choices: gold or platinum.

For the gemstone category, we have five choices: let's say they are diamond, ruby, emerald, sapphire, and amethyst.

To calculate the total number of ring options, we multiply the number of choices in each category:

Number of metal choices = 2 (gold or platinum)

Number of gemstone choices = 5 (diamond, ruby, emerald, sapphire, amethyst)

Total number of ring options = Number of metal choices × Number of gemstone choices

= 2 × 5

= 10

Therefore, the jewelry store sells a total of 10 different ring options.

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An airline wants to test the null hypothesis that 60 percent of its passengers object to smoking inside the plane. Explain under what conditions they would be committing a type I error and under what conditions they would be committing a type II error.

Answers

To minimize the chances of committing Type I and Type II errors, careful consideration should be given to factors such as sample size, significance level, and effect size when designing the study and conducting the hypothesis test.

Show that what will be the true proportion of passengers who object to smoking is indeed 60% in an hypothesis testing.

In statistical hypothesis testing, a Type I error occurs when the null hypothesis is rejected even though it is true. In this case, it means rejecting the null hypothesis that 60% of the airline passengers object to smoking inside the plane when, in reality, the true proportion of passengers who object to smoking is indeed 60%.

Conditions leading to a Type I error:

1. Sample data suggests a significant difference from the null hypothesis, leading to its rejection, even though the true population proportion is actually 60%.

2. The significance level or alpha level is set too high, increasing the probability of rejecting the null hypothesis incorrectly.

3. The sample size is too small, leading to insufficient statistical power to accurately detect the true proportion.

On the other hand, a Type II error occurs when the null hypothesis is not rejected, even though it is false. In this case, it means failing to reject the null hypothesis that 60% of the airline passengers object to smoking inside the plane when, in reality, the true proportion of passengers who object to smoking is different from 60%.

Conditions leading to a Type II error:

1. Sample data fails to provide sufficient evidence to reject the null hypothesis, even though the true population proportion is different from 60%.

2. The significance level or alpha level is set too low, making it harder to reject the null hypothesis even when it is false.

3. The sample size is too small, reducing the statistical power to detect differences from the null hypothesis.

To minimize the chances of committing Type I and Type II errors, careful consideration should be given to factors such as sample size, significance level, and effect size when designing the study and conducting the hypothesis test.

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Let u =[2 -5 -1] and v =[-7 -4 6]. Compute and compare u middot v, ||u||^2, ||v||^2, and ||u + v||^2. Do not use the Pythagorean theorem.

Answers

We have:

u · v = (2)(-7) + (-5)(-4) + (-1)(6) = -14 + 20 - 6 = 0

||u||^2 = (2)^2 + (-5)^2 + (-1)^2 = 4 + 25 + 1 = 30

||v||^2 = (-7)^2 + (-4)^2 + 6^2 = 49 + 16 + 36 = 101

||u + v||^2 = (2 - 7)^2 + (-5 - 4)^2 + (-1 + 6)^2

            = (-5)^2 + (-9)^2 + 5^2

            = 25 + 81 + 25

            = 131

Note that we did not use the Pythagorean theorem to compute any of these quantities.

We can compare these values as follows:

u · v = 0, which means that u and v are orthogonal (perpendicular) to each other.

||u||^2 = 30, which means that the length of u (in Euclidean space) is √30.

||v||^2 = 101, which means that the length of v (in Euclidean space) is √101.

||u + v||^2 = 131, which means that the length of u + v (in Euclidean space) is √131.

We can also observe that ||u|| < ||u + v|| < ||v||, which is a consequence of the triangle inequality.

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Part 1: Create a "Study Guide" that addresses each topic of the course. Include specific formulae and theory. The "Study Guide" should include the following topics. Basically summarize each unit with examples in a simple, but concise way: 1) Characteristics and Properties of Functions 2) Polynomial Functions 3) Polynomial Equations and Inequalities 5) Trig Functions and Identities 6) Exponentials and Logarithmic Functions Your study guide MUST be created using technology. Feel free to make is as creative as possible. If you want to make a hand made drawn poster, that is also allowed

Answers

Topic 1:Functions are a relation between a set of inputs and outputs. It can be represented by an equation or graph. Characteristics of a function are domain, range, intervals, maximum, minimum, and intercepts.Example: f(x) = x² is a function with the domain of all real numbers.

Its range is all non-negative real numbers. It has a minimum at x=0 and no maximum. The x-intercept is (0,0) and there is no y-intercept.

Topic 2: Polynomial FunctionsTheory: Polynomial functions are functions of the form f(x) = a₀ + a₁x + a₂x² + … + anxn, where a₀, a₁, …, an are constants and n is a non-negative integer.

They can have degree, leading coefficient, and zeros.Example: f(x) = x³ – 2x² – 5x + 6 is a polynomial function of degree 3 with a leading coefficient of 1. Its zeros are x= -1, x=2, and x=3.

Topic 3: Polynomial Equations and InequalitiesTheory: Polynomial equations and inequalities are equations or inequalities that involve polynomial functions. They can be solved by factoring, using the quadratic formula, or graphing.

Example: x³ – 2x² – 5x + 6 = 0 can be factored as (x-1)(x-2)(x+3) = 0 to get the solutions x=1, x=2, and x= -3.

Topic 4: Trig Functions and IdentitiesTheory: Trig functions are functions that relate angles to sides of a triangle. The six trig functions are sine, cosine, tangent, cosecant, secant, and cotangent. Trig identities are equations that involve trig functions.Example: sin(x) and cos(x) are trig functions. sin²(x) + cos²(x) = 1 is a trig identity.

Topic 5: Exponentials and Logarithmic FunctionsTheory: Exponential functions are functions of the form f(x) = abx, where a is a constant and b is a positive real number. Logarithmic functions are the inverse of exponential functions. They can be used to solve exponential equations.

Example: f(x) = 2x is an exponential function. log2(8) = 3 is the solution to 2³ = 8.Part 2: The study guide created using technology:

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(1 point) find the value of k for which the constant function x(t)=k is a solution of the differential equation 4t3dxdt−6x−6=0.

Answers

The value of k for which the constant function x(t) = k is a solution of the differential equation 4t^3(dx/dt) - 6x - 6 = 0 is k = -1.

To find the value of k for which the constant function x(t) = k is a solution of the given differential equation, we substitute x(t) = k into the equation and solve for the value of k that satisfies the equation.

The given differential equation is:

4t^3(dx/dt) - 6x - 6 = 0

Substituting x(t) = k, we have:

4t^3(dk/dt) - 6k - 6 = 0

Since x(t) = k is a constant function, the derivative dx/dt is zero, so dk/dt is also zero. Therefore, we can simplify the equation further:

-6k - 6 = 0

To solve for k, we isolate it on one side of the equation:

-6k = 6

Dividing both sides by -6, we get:

k = -1

Therefore, the value of k for which the constant function x(t) = k is a solution of the differential equation 4t^3(dx/dt) - 6x - 6 = 0 is k = -1.

In summary, by substituting the constant function x(t) = k into the given differential equation and solving for k, we find that the value of k is -1. This means that when x(t) is a constant function equal to -1, it satisfies the differential equation.

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