The perimeter of the quarter circle with radius 1 yard is approximately 2.57 yards.
To find the perimeter of a quarter circle, we need to add up the lengths of its curved edge and its straight edge.
In this case, the curved edge is a quarter of a circle with radius 1 yard. The formula for the circumference of a circle is C = 2πr, where r is the radius of the circle. Since we only need a quarter of the circumference, we can divide the formula by 4:
C = (2πr)/4
Substituting r = 1, we get:
C = (2π(1))/4
C = π/2
Therefore, the curved edge of the quarter circle has a length of π/2 yards. The straight edge of the quarter circle is simply the radius, which is also 1 yard.
So the perimeter of the quarter circle is the sum of the curved edge and the straight edge:
Perimeter = (π/2) + 1
Using 3.14 for π and adding the two terms, we get:
Perimeter ≈ 2.57 yards
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Assume X is normally distributed with a mean of 10 and a standard deviation of 2. Determine the value for x that solves each of the following:
(a) P(X > x) = 0.5
(b) P(X > x) = 0.95
(c) P(x < X < 10) = 0.2
(d) P(-x < X - 10 < x) = 0.95
(e) P(-x < X - 10 < x) = 0.99
The values of 'x' that solve for given conditions are (a) 11.349 (b) 13.29 (c) 7.44 and 12.56 (d) 6.08 and 13.92 (e) 5.84 and 14.16.
The formula for z-score:The z-score, also known as the standard score, is a measure of how many standard deviations a data point is away from the mean of its distribution.
The formula for calculating the z-score of a data point x, with mean μ and standard deviation σ, is:
z = (x - μ) / σwhere z is the z-score.
Here we have
X is normally distributed with a mean of 10 and a standard deviation of 2
As we know z score, z = (x - μ) / σ.
=> x = μ + zσ
Hence, to find the 'x' value we need to know the value of the z score in each situation
(a) P(X > x) = 0.5
The z-score corresponding to a right-tail probability of 0.5 is 0.6745.
=> x = 10 + 0.6745 * 2
=> x = 11.349
(b) P(X > x) = 0.95
The z-score corresponding to a right-tail probability of 0.05 is 1.645.
Substituting the given values into the formula, we get:
x = 10 + 1.645 * 2
x = 13.29
(c) P(x < X < 10) = 0.2
The z-score corresponding to a left-tail probability of 0.1 is -1.28 and the z-score corresponding to a right-tail probability of 0.1 is 1.28.
From formula, z = (x - μ) / σ
=> -1.28 = (x - 10) / 2
=> x = 7.44
and
=> 1.28 = (x - 10) / 2
=> x = 12.56
Therefore,
The values of x that solve P(x < X < 10) = 0.2 are 7.44 and 12.56.
(d) P(-x < X - 10 < x) = 0.95
The z-score corresponding to a right-tail probability of 0.025 is 1.96.
=> -1.96 = (-x - 10) / 2
=> x = 6.08
and
=> 1.96 = (x - 10) / 2
=> x = 13.92
Therefore,
The values of x that solve P(-x < X - 10 < x) = 0.95 are 6.08 and 13.92.
(e) P(-x < X - 10 < x) = 0.99
The z-score corresponding to a right-tail probability of 0.005 is 2.58.
=> -2.58 = (-x - 10) / 2
=> x = 5.84
and
=> 2.58 = (x - 10) / 2
=> x = 14.16
Therefore,
The values of x that solve P(-x < X - 10 < x) = 0.99 are 5.84 and 14.16.
Therefore,
The values of 'x' that solve for given conditions are (a) 11.349 (b) 13.29 (c) 7.44 and 12.56 (d) 6.08 and 13.92 (e) 5.84 and 14.16.
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Out of 100 problems on a test,15 problems,or 15% of the problems, have two parts. So far, you have completed 40 problems. If the two-part problems appear throughout the test, about how many of those 40 problems have two parts?
Thus, out of 40 problems, 6 problems will have two parts problems which is 15% of the 40.
Explains about the percentage:The phrase "percent" refers to a number out of 100 or per 100. The term is derived from the Roman expression per centum, which means "by the hundred." Hence, a single percent would be one of those hundred units, and one percent, for every one hundred of anything.
Given data:
Out of 100 problems - 15% have two parts.
Out of 100 problems - 85% will not have two parts.
Thus, out of 40 problems, also 15% will contain two parts.
Then,
Number of two-part problem = 15% of 40
Number of two-part problem = 15 * 40 / 100
Number of two-part problem = 600 / 100
Number of two-part problem = 6
Thus, out of 40 problems, 6 problems will have two parts which is 15% of the 40.
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Father's age is five times than the son's age. If the sum of their ages is 60 years, find their present ages.
Father : 50 years old
Son : 10 years old
Which one of the following graphs represents the solution of the inequality −3x+16≥−2
?
Answer:
B
Step-by-step explanation:
the answer is B please see on the attached.
Your credit card charges an interest rate of 2% per month. You have a current balance of $1,000, and want to pay it off. Suppose you can afford to pay $100 per month. What will your balance be at the end of one year? You will still owe $72.97 after one year. (Round to the nearest cent.) X x That's incorrect. We want to compute the future value of our account balance. Here is the cash flow timeline over the next 12 months: Month 0 1 2 11 12 Cash flow $1,000 - $100 - $100 - $100 -$100 From the timeline we can see that we need to combine the FV of our current balance with the FV of our annuity payments of $100 per month. The FV of our current balance is: FV = PV x (1 + r)" The FV of the annuity payments is: FV=cxı((1+y)+ - 1) We can also compute this result using a spreadsheet. OK Your credit card charges an interest rate of 2% per month. You have a current balance of $1,000, and want to pay it off. Suppose you can afford to pay $100 per month. What will your balance be at the end of one year?
After calculating the future value of the current balance, You will still owe $72.97 after one year.
Calculate the future value of the current balance: FV = PV x (1 + r)
Where, FV = Future Value, PV = Present Value (the current balance of $1,000), and r = interest rate of 2% per month.
Thus, FV = 1,000 x (1 + 0.02) = 1,020
Calculate the future value of the annuity payments of $100 per month:
FV = c x ı((1 + y)+ - 1)
Where, c = $100, y = interest rate of 2% per month.
Thus, FV = 100 x ı((1 + 0.02)12 - 1) = 1,246.24
Calculate the future value of the account balance: FV = 1,020 + 1,246.24 = 2,266.24
Finally, calculate the balance at the end of one year:
Balance at the end of one year = Future Value - Annuity Payments
Thus, Balance at the end of one year = 2,266.24 - (12 x 100) = 72.97.
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What is the missing reason in step 8? statements reasons 1. circle m with inscribed ∠kjl and congruent radii jm and ml 1. given 2. △jml is isosceles 2. isos. △s have two congruent sides 3. m∠mjl = m∠mlj 3. base ∠s of isos. △are ≅ and have = measures 4. m∠mjl m∠mlj = 2(m∠mjl) 4. substitution property 5. m∠kml = m∠mjl m∠mlj 5. measure of ext. ∠ equals sum of measures of remote int. ∠s of a △ 6. m∠kml =2(m∠mjl) 6. substitution property 7. measure of arc k l = measure of angle k m l 7. central ∠ of △ and intercepted arc have same measure 8. measure of arc k l = 2 (measure of angle m j l) 8. ? 9. one-half (measure of arc k l) = measure of angle m j l 9. multiplication property of equality reflexive property substitution property base angles theorem second corollary to the inscribed angles theorem
The answer fοr this is Substitutiοn Prοperty
What is Substitutiοn Prοperty?
The substitutiοn prοperty is a cοncept in algebra that is used tο substitute the value οf a given variable οr a quantity intο an expressiοn tο find the value οf the unknοwn. In simple wοrds, we can say that the substitutiοn prοperty is used tο replace the value οf a quantity in an equatiοn οr an expressiοn tο sοlve a mathematical prοblem. We will discuss the meaning οf the substitutiοn prοperty οf equality, the substitutiοn prοperty in geοmetry, and the direct substitutiοn prοperty in limits in the fοllοwing sectiοns.
Substitutiοn Prοperty is cοnsidered as οne οf the mοst intuitive οf the mathematical prοperties that yοu'll prοbably encοunter. Yοu may have been using substitutiοn withοut even knοwing it. This prοperty says that if x=y, then in any true equatiοn invοlving y, yοu can replace y with x, and yet yοu'll still have a true equatiοn.
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Take a loοk at the attached example shοwn below.
A teacher just asked everyone to measure a segment on a worksheet. Based solely on the data, which measure of central tendency should be used based on the following measurements: 8. 3 cm, 8. 4 cm, 8. 8 cm, 8. 2 cm, 8. 3 cm, 8. 0 cm, 8. 1 cm, 8. 5 cm
The mean of the data is 8.1 cm, which is the most appropriate measure of central tendency to use in this situation.
The most appropriate measure of central tendency to use in this situation is the mean. The mean is the sum of all of the values divided by the number of values. In this case, this would be 8.1 cm (the sum of 8.3 cm, 8.4 cm, 8.8 cm, 8.2 cm, 8.3 cm, 8.0 cm, 8.1 cm, and 8.5 cm divided by 8).
The formula for mean is as follows:
Mean = Sum of values / Number of values
In this situation, the sum of values is 8.3 cm + 8.4 cm + 8.8 cm + 8.2 cm + 8.3 cm + 8.0 cm + 8.1 cm + 8.5 cm = 67.7 cm
Number of values = 8
Mean = 67.7 cm / 8 = 8.1 cm
The mean is the best measure of central tendency to use in this situation because it is the most accurate representation of the data, as it takes into account all of the values in the dataset.
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A rectangle has sides of 72 cm and 36 cm. Another rectangle has sides of 4 cm and 8 cm. What is the scale ratio?
Scale ratio is 9 cm which can be calculated by comparing lengths and using division.
The scale ratio between two rectangles is a way to compare the size of their corresponding sides. It is calculated by dividing the length of one side of the first rectangle by the length of the corresponding side of the second rectangle.
In this case, let's compare the length of the longer side of the first rectangle (72 cm) with the length of the longer side of the second rectangle (8 cm):
scale ratio = 72 cm ÷ 8 cm = 9
This means that the longer side of the first rectangle is 9 times as long as the longer side of the second rectangle. We could also calculate the scale ratio using the shorter sides:
scale ratio = 36 cm ÷ 4 cm = 9
In either case, the scale ratio is 9, which tells us that the first rectangle is 9 times as large as the second rectangle. This can be useful for creating accurate scale drawings or models of objects.
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PLEASE HELP GIVING POINTS!!!!!
Answer:
its c
Step-by-step explanation:
If Chandler uses 3 gigabytes of data this
month, how much will his cell phone bill be?
Bert is at the bakery. He is looking at different types of cakes. He sees one that serves 2 and costs $4.50, another serves 8 and costs $10.00, and another cake that serves 10 and costs $20.00. Which cake is the most expensive per serving?
Answer:
To find out which cake is the most expensive per serving, we need to calculate the cost per serving for each cake.
The first cake serves 2 people and costs $4.50. So the cost per serving is:
$4.50 ÷ 2 = $2.25 per serving
The second cake serves 8 people and costs $10.00. So the cost per serving is:
$10.00 ÷ 8 = $1.25 per serving
The third cake serves 10 people and costs $20.00. So the cost per serving is:
$20.00 ÷ 10 = $2.00 per serving
Therefore, the first cake is the most expensive per serving, at $2.25 per serving.
PLEASE HELP ME SOMEONE
Knowing that the drum is a cylinder, we will get that:
The area of leather needed 2,769.48 cm^2The area of wood needed 1,378.42 cm^2How to find the areas?Here we can see that the drum is a cylinder, remember that the circular areas of a cylinder of radius R and height H are:
A = 2*3.14*R^2
And the curved surface is:
S = 2*3.14*R*H
Here we can see that:
R = 21cm
H = 9.5cm
a) The area of leather needed is:
A = 2*3.14*(21cm)^2 = 2,769.48 cm^2
b) The area of wood needed is:
S = 2*3.14*21cm*9.5cm = 1,378.42 cm^2
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Solve the problem. Find the probability P(E C ) if P(E)=0.42 \begin{tabular}{|c|c|} \hline a & 0.29 \\ \hline b & 0.14 \\ \hline c & 0.32 \\ \hline d & 0.58 \end{tabular}
Combining events A and B results in the entire event, with a probability of 1 for the entire event. The probability P(EC)= 1-P(E) OR P(EC)= 1-0.42= 0.58 is the result.
When conducting an experiment, the probability of an event serves as a gauge for the likelihood that the event will actually occur. When there are only two possible outcomes, such as passing an exam or failing it, complementary events take place. The opposite of an event is represented by the complement.
When one event only happens if and when the other one doesn't, two events are said to be complementary. For instance, it rains or it doesn't.
The probability of an event occurring when added to the probability of the complement of that event occurring is always 1. Considering A to be an event, P(A) + P(A') = 1.
Associated events are exhausting.
Events that complement one another can never coexist.
P(EC)+P(E)=1
P(EC)= 1-P(E)
P(EC)= 1-0.42
P(EC)= 0.58.
Hence, the probability P(EC)= 0.58.
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Multiplying polynomials coloring activity answer key 2x^2+10x-36
3
2x^2-32
4
2x^2-17x+39
5
5x^2-15x-39
6
5x^2-23x+3
7
2x^2-68x-30
8
3x^2+15
9
6x^2+5x-39
10
8x^2-18x-35
11
7x^2-6x-34
12
x^3-18x^2+27x+17
The activity involved multiplying two polynomials using the distributive property to find the product, which has a degree equal to the sum of the degrees of the terms being multiplied together.
The activity involved multiplying two polynomials. This involves using the distributive property to multiply each term of one of the polynomials with each term of the other polynomial.
For example, when multiplying [tex]2x2+10x-36[/tex] with 3 we use the distributive property to get [tex]6x2+30x-108[/tex].
To find the product of two polynomials, each term of one polynomial must be multiplied with each term of the other polynomial. The terms of the product of two polynomials will have the same degree as the sum of the degrees of the terms being multiplied together.
For example, when multiplying [tex]2x2-32[/tex] with 4 we use the distributive property to get [tex]8x2-128[/tex]. Here the degree of the product is 2, which is the sum of the degrees of the terms being multiplied together [tex](2+0=2)[/tex].
To multiply two polynomials, we use the distributive property to multiply each term of one polynomial with each term of the other polynomial. The degree of the product will be the sum of the degrees of the terms being multiplied together.
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Complete question:
What is the product of [tex]2x^2+10x-36[/tex] and [tex]3x-4[/tex]?
Four identical circles are lined up in a row with no gaps between them such that the diameters for a segment that is 68 centimeters long. What is the combined area of all the circles to the nearest hundredth? Use 3. 14 for π
The combined area of all the circles is 907.46 sq. cm.
What is the area of a circle?The area of a given circle is the amount of space that the circle would cover in a 2 dimensional plane. The area of a circle can be determined by;
area of a circle = π r^2
In the given question, the diameters of the circles form a segment that is 68 cm. Thus;
diameter of one circle = 68/ 4
= 17 cm
So that,
radius of each circle = diameter/ 2
= 17/ 2
= 8.5 cm
area of each circle = 3.14 *(8.5)^2
= 226.865
The area of the circles combined = 4*226.865
= 907.46
The combined area of all the circles is 907.46 sq. cm.
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Given the graph of the function, select the statement that describes the end behavior of the function.- Answer D is cut off sorry.
WILL GIVE BRAINLIEST
As x approaches to infinity y also approaches to infinity.
Define functionIn mathematics, a function is a relation between a set of inputs (called the domain) and a set of possible outputs (called the range) with the property that each input is related to exactly one output. Formally, a function f from a set A to a set B is defined as a subset of the Cartesian product A × B such that for every element a in A, there is a unique element b in B such that (a, b) belongs to the subset.
A function can be represented using the function notation f(x) = y, where x is the input (or independent variable), y is the output (or dependent variable), and f is the name of the function. The value of f(x) depends on the value of x and the rules of the function.
From the graph
x approaches to infinity
y also approaches to infinity.
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6% of a length is 570m what is the origin length give your answer in meters
6% of a length is 570m and the original length can be calculated by dividing 570m by 0.06, resulting in 9500m.
To calculate the original length given that 6% of it is 570m, we can use the following formula: Original length = (570 ÷ 0.06) Original length = 9500mTo solve this problem, firstly the percentage of 6% needs to be converted into a decimal by dividing 6 by 100. This will give us 0.06. Then, the original length is found by dividing the given value of 6% (570m) by the decimal equivalent (0.06). Therefore, the original length is 9500m. To summarise, 6% of a length is 570m and the original length can be calculated by dividing 570m by 0.06, resulting in 9500m.
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(
6. 25
x
+
12
)
−
(
4. 25
x
−
7
)
(
6. 2
5
+
1
2
)
−
(
4. 2
5
−
7
)
The expression (6.25x + 12) - (4.25x - 7) / (6.25 + 12) - (4.25 - 7) to its simplest form, which is (2x + 19) / 21.
To simplify the given expression, we need to apply the order of operations, which is Parentheses, Exponents, Multiplication and Division (from left to right), and Addition and Subtraction (from left to right).
First, we will simplify the expression inside the parentheses using the distributive property.
(6.25x + 12) - (4.25x - 7) = 6.25x + 12 - 4.25x + 7
Next, we will combine like terms, which are the terms with the same variable and exponent.
6.25x - 4.25x = 2x
12 + 7 = 19
Therefore, the simplified expression becomes:
2x + 19
Now, we will simplify the expression in the denominator.
(6.25 + 12) - (4.25 - 7) = 18.25 - (-2.75)
Remember that subtracting a negative number is the same as adding a positive number.
18.25 + 2.75 = 21
Finally, we can write the simplified expression as:
(2x + 19) / 21
This is the simplest form of the given expression, and it cannot be further simplified.
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Complete Question:
Simplify the expression: ( 6. 25 x + 12 ) − ( 4. 25 x − 7 ) ( 6. 2 5 + 1 2 ) − ( 4. 2 5 − 7 )
Graph the solution to the following system of inequalities in the coordinate plane.
y < -2x - 4
x ≥ -3
Answer:
green is x ≥ -3
blue is y < -2x - 4
Step-by-step explanation:
Cola makers test new recipes for loss of sweetness during storage. Trained tasters rate the sweetness before and after
storage. Here are the sweetness losses (sweetness before storage minus sweetness after storage) found by 10 tasters
for one new cola recipe:
2. 0,0. 4,0. 7, 2. 0-0. 4 2. 2-1. 3 1. 2 1. 12. 3
Are these data good evidence that the cola lost sweetness? Use the four-step process and use a significance level of
5%. Assume the data is taken from a normal distribution.
The null hypothesis was rejected as the mean of the sweetness losses was greater than the critical value. Thus, the cola did lose sweetness.
1. State the null hypothesis: The null hypothesis is that the cola did not lose sweetness.
2. Determine the level of significance: The level of significance is 5%.
3. Calculate the test statistic and The test statistic is calculated by subtracting the mean of the sweetness losses from zero.
4. Make a decision: If the test statistic is greater than the a critical value, then the null hypothesis should be rejected and the cola did lose sweetness. which is greater than the a critical value of 0.05. Therefore, the null hypothesis should be rejected and the cola did indeed lose sweetness.
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Pls answerrrrr
with simple working
the answer will be -137
The price of a latte dropped from $3.50 to $3.02. Find the absolute change and relative change of the price
of a latte.
Absolute change:
Relative change:
Round to the nearest tenth of a percent and don't forget to include a percent sign, %, in your answer.
For the latte, the values are obtained as -
Absolute change - $0.48
Relative change - 13.7%
What is absolute change?
Absolute change tells us the magnitude of the difference or change between two values, regardless of whether the change was an increase or a decrease. It is often used in economics, finance, and other fields to measure changes in variables such as prices, income, sales, or quantities.
The absolute change in the price of a latte is the difference between the original price and the new price, without regard to the direction of the change.
Absolute change = | New price - Original price |
Absolute change = | $3.02 - $3.50 |
Absolute change = $0.48
The relative change in the price of a latte is the absolute change expressed as a percentage of the original price.
Relative change = (Absolute change / Original price) x 100%
Relative change = ($0.48 / $3.50) x 100%
Relative change = 13.7%
Therefore, the absolute change in the price of a latte is $0.48, and the relative change is 13.7%.
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Use the CER strategy to solve the following questions.
1. As an accountant, you keep track of invoices and payments. You received a payment of
$4, 823.28 from a client. Your company's money transfer provider charges a fee that
reduces the amount paid by 1 %. To match the amount you received to the invoice, you
need to know the original amount the client paid before the transfer fee was charged.
What was the original amount the client paid?
Answer:
48,232.8
Step-by-step explanation:
4,823.28 x 0.01
zoe the goat is tied by a rope to one corner of a 15 meter-by-25 meter rectangular barn in the middle of a large, grassy field. over what area of the field can zoe grace of the rope is:
If Zoe the goat is tied to a corner of a rectangular barn measuring 15m by 25m in the middle of a field, Zoe can graze within an area of 2660.5 sqm.
The area of the field that Zoe can graze depends on the length of the rope, which is not given in the problem. However, we can use the Pythagorean theorem to find the length of the diagonal of the barn, which represents the maximum length of the rope.
The diagonal of a rectangle with sides of length 15 meters and 25 meters can be found using the Pythagorean theorem:
diagonal² = 15² + 25²
diagonal² = 225 + 625
diagonal² = 850
diagonal =[tex]\sqrt{850}[/tex] ≈ 29.15 meters
This means that the maximum length of the rope is about 29.15 meters. The area that Zoe can graze is a circle with radius equal to the length of the rope. We can use the formula for the area of a circle to find this area:
Area = π(radius)²
Area = π(29.15)²
Area ≈ 2660.5 square meters
Therefore, the correct answer is approximately 2660.5 square meters
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Last week, the price of apples at a grocery store was $1.60 per pound. This week, apples at the same grocery store are on sale at a 10% discount. What is the total price of 4 1/2 pounds of apples this week at the grocery store?
A $4.77
B $6.48
C $6.75
D $6.93
Answer:
$6.48
Step-by-step explanation:
First, let's find the discount.
1.60 * 0.1 = $0.16 (the discount)
Second, subtract the discount to the original price.
1.60 - 0.16 = $1.44 (price after discount was applied)
Third, multiply to 4 1/2 to find how much it will cost.
1.44 * 4.5 = $6.48 (price of 4 1/2 pounds of apples with discount applied)
Rachel goes to a shopping mall to buy shirts and pants for her
children. She has a total budget of $200, and she's going to
buy shirts for $25 each and pants for $20 each. Write an
inequality to describe the possible number of shirts and Pants
that Rachel can buy. If Rachel buys 5 Pants, what is the
maximum number of shirts she can buy?
Answer:
4
Step-by-step explanation:
Let x be the number of shirts that Rachel can buy, and y be the number of pants she can buy. Then the cost equation would be:
Cost = 25x + 20y
Since Rachel has a total budget of $200, we can write:
25x + 20y ≤ 200
To find the maximum number of shirts that Rachel can buy if she buys 5 pants, we can substitute y = 5 into the inequality and solve for x:
25x + 20(5) ≤ 200
25x ≤ 100
x ≤ 4
Therefore, Rachel can buy a maximum of 4 shirts if she buys 5 pants.
please help i will give 100 points
Answer:
x= 3
Step-by-step explanation:
Since triangle is equilateral...
2y = 25x - 15
And....
Here,
2y + 2y + 2y = 180
6y = 180
y = 180/6
= 30
Again,
2y = 25x -15
2*30 + 15 = 25 x
x = 75/25
= 3
P= {factors of 16), Q=-{multiples of 4 of less than 17} and R={whole numbers from 12 to 16
The factors of 16 are 1, 2, 4, 8, and 16, so we have:
P = {1, 2, 4, 8, 16}
What else does factor go by?Divisors are another name for factors. As a result, they can equally split into the number of which they are a factor. In other words, they do not even leave a remnant when you divide with them. For instance, 36 has a factor of 4 in it.
We can write the sets P, Q, and R using set-builder notation as follows:
P = {1, 2, 4, 8, 16} (the factors of 16)
Q = {0, 4, 8, 12, 16} (the multiples of 4 less than 17)
R = {12, 13, 14, 15, 16} (the whole numbers from 12 to 16)
The multiples of 4 less than 17 are 4, 8, 12, and 16. However, Q is defined as the complement of this set, so we have:
Q = {-3, -2, -1, 0, 1, 2, 3, 5, 6, 7, 9, 10, 11, 13, 14, 15}
The whole numbers from 12 to 16 are 12, 13, 14, 15, and 16, so we have:
R = {12, 13, 14, 15, 16}
Due to the fact that it is a combination of 4 and less than 17, we have included 0 in set Q.
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Five cards are dealt from a standard deck of 52. Write down numerical expressions:(a) The probability that the third card is an ace.(b) The probability that all cards are of the same suit.(c) The probability of two or more aces.
The probability that the third card will be an ace is 0.0045, probability of all cards to be of same suit is 0.000495, and the probability of two or more aces is 0.004.
What is probability?
Probability is the study of the chances of occurrence of a result, which are obtained by the ratio between favorable cases and possible cases.
(a) The probability that the third card is an ace:
We can approach this problem by using the conditional probability formula, which states that the probability of an event A given that event B has occurred is:
P(A|B) = P(A and B) / P(B)
Let A be the event that the third card is an ace, and let B be the event that the first two cards are not aces. The probability of the first card being an ace is 4/52 (since there are four aces in a standard deck of 52 cards). The probability of the second card being an ace given that the first card was not an ace is 3/51 (since there are three aces left in the deck of 51 cards). The probability of the third card being an ace given that the first two cards were not aces is 2/50 (since there are two aces left in the deck of 50 cards).
Therefore, using the conditional probability formula, we have:
P(A|B) = P(A and B) / P(B)
P(A|B) = (4/52) * (3/51) * (2/50) / (1 - (4/52) * (3/51))
P(A|B) ≈ 0.0045
So the probability that the third card is an ace is approximately 0.0045.
(b) The probability that all cards are of the same suit:
There are four suits in a standard deck of cards: clubs, diamonds, hearts, and spades. We can compute the probability that all five cards are of the same suit as follows:
P(all cards are of the same suit) = P(first card is a particular suit) * P(second card is the same suit) * P(third card is the same suit) * P(fourth card is the same suit) * P(fifth card is the same suit)
P(all cards are of the same suit) = (13/52) * (12/51) * (11/50) * (10/49) * (9/48)
P(all cards are of the same suit) ≈ 0.000495
So the probability that all cards are of the same suit is approximately 0.000495.
(c) The probability of two or more aces:
We can compute the probability of two or more aces by considering the complementary event: the probability that there are zero or one aces in the five cards dealt. The probability of getting zero aces is:
P(zero aces) = (48/52) * (47/51) * (46/50) * (45/49) * (44/48)
P(zero aces) ≈ 0.617
The probability of getting one ace is:
P(one ace) = (4/52) * (48/51) * (47/50) * (46/49) * (45/48) * 5
P(one ace) ≈ 0.379
Therefore, the probability of two or more aces is:
P(two or more aces) = 1 - P(zero aces) - P(one ace)
P(two or more aces) ≈ 0.004
So the probability of two or more aces is approximately 0.004.
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The first four terms in a sequence are
2 5 8 11
If the 19th term in the sequence is 56.
Answer:
We can see that each term in the sequence is 3 more than the previous term. So we can find the 5th term by adding 3 to the fourth term, the 6th term by adding 3 to the 5th term, and so on.
5th term = 11 + 3 = 14
6th term = 14 + 3 = 17
7th term = 17 + 3 = 20
...
We can see that each term can be written as:
term = 2 + 3n
where n is the position of the term in the sequence starting from 0 (i.e. the first term is at position 0, the second term is at position 1, etc.)
To find the 19th term, we can substitute n = 17 into the formula:
19th term = 2 + 3(17) = 53
However, the problem states that the 19th term is actually 56. This means that we need to adjust our formula to account for any initial shift in the sequence. We can do this by subtracting a certain value from n, so that the first term in the sequence corresponds to n = 0.
Let's call this adjustment value "a". We know that when n = 0, the first term in the sequence is 2. So we can set up an equation:
2 + 3a = 2
Solving for a, we get a = 0.
Therefore, the adjusted formula for the nth term is:
term = 2 + 3(n-1)
where n is the position of the term in the sequence starting from 1.
Substituting n = 19, we get:
19th term = 2 + 3(18) = 56
So our adjusted formula is correct, and the answer is 56.
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