The indicated z-score is 0.84.
What is the standard normal distribution?The standard normal distribution, also known as the Gaussian distribution or the bell curve, is a probability distribution that describes a set of data points that are normally distributed around the mean with a known variance. It is characterized by its mean, which is 0, and its standard deviation, which is 1. The shape of the distribution is symmetric and bell-shaped, with the highest probability density occurring at the mean.
From the given information, we know that the shaded area under the curve is 0.1949. This area corresponds to the probability that a random variable from a standard normal distribution falls between the mean and some unknown value, which we'll call "z".
Looking up the standard normal distribution table or using a calculator, we find that the z-score corresponding to an area of 0.1949 is approximately 0.84.
Therefore, the indicated z-score is 0.84.
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Roberto bought a $340,000 house, paying 20% down, and financing the rest at 5% interest for 30 years. Her
monthly payments are $1460.15. How much will he really pay for her $340,000 house?
Roberto will pay a total of $
for the house.
Answer:
Roberto will pay a total of $525,654 for the house.
Without using tables Find the value of 0.45*0.91÷0.0117
the value of 0.45 × 0.91 ÷ 0.0117 is 35.
Why it is and what is PEMDAS?
To find the value of 0.45 * 0.91 ÷ 0.0117, we can use the order of operations, which is also known as PEMDAS (Parentheses, Exponents, Multiplication and Division, and Addition and Subtraction).
First, we need to perform the multiplication of 0.45 and 0.91:
0.45 ×0.91 = 0.4095
Then, we need to divide the result by 0.0117:
0.4095 ÷ 0.0117 = 35
Therefore, the value of 0.45 * 0.91 ÷ 0.0117 is 35.
PEMDAS is a mnemonic used to remember the order of operations in arithmetic and algebraic expressions. It stands for Parentheses, Exponents, Multiplication and Division, and Addition and Subtraction.
The order of operations is as follows:
Parentheses: Perform operations within parentheses first, working from the innermost set of parentheses to the outermost.
Exponents: Perform any calculations involving exponents, such as raising a number to a power or taking the square root.
Multiplication and Division: Perform multiplication and division in the order that they appear from left to right.
Addition and Subtraction: Perform addition and subtraction in the order that they appear from left to right.
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8.
A right triangle shaped sail has an area of 150 square
meters. The base of the sail is 10 less than twice the
ight. Find the base and the height.
Answer:
Base=20m height= 15m
Step-by-step explanation:
The area of a triangle is given by:
[tex]A=\frac{bh}{2}[/tex]
since base is 10 less than twice the height b=2h-10
plugin in those values and knowing area is 150
[tex]150=[/tex][tex]\frac{h(2h-10)}{2}[/tex]
then solve for h
[tex]300=2h^2-10h[/tex] this is quadratic equation
[tex]h^2-5h-150=0[/tex]
factorizing (notice you can also use quadratic equation)
[tex](h-15)(h+10)=0[/tex]
which positive solution (height cant be negative) is h=15
then the base is b=2(15)-10=20
Answer:
The height is 15 meters and the base is 20 meters.
Step-by-step explanation:
Let's use the formula for the area of a right triangle:
A = (1/2)bh
Where A is the area, b is the base, and h is the height.
We're given that the area is 150 square meters, so we can substitute that in:
150 = (1/2)bh
Next, we're told that the base is 10 less than twice the height. In other words,
b = 2h - 10
We can substitute this expression for b into the equation for the area:
150 = (1/2)(2h - 10)h
Simplifying:
300 = (2h - 10)h
300 = 2h^2 - 10h
2h^2 - 10h - 300 = 0
Dividing both sides by 2:
h^2 - 5h - 150 = 0
Now we can solve for h using the quadratic formula:
h = (-(-5) ± sqrt((-5)^2 - 4(1)(-150))) / 2(1)
h = (5 ± sqrt(625)) / 2
h = (5 ± 25) / 2
We can ignore the negative root (which gives us a negative height), so:
h = 15
Now we can use the expression for b in terms of h to find the base:
b = 2h - 10
b = 2(15) - 10
b = 20
Therefore, the height is 15 meters and the base is 20 meters.
In a science experiment the temperature of a liquid is first read at 11.15am. If the temperature is read every 12 hours, at what time will the eight temperature reading be taken?
If the temperature is read every 12 hours, then the eighth temperature reading will be taken at 11.15 pm three days after the first reading.
What is temperature?Temperature is a measure of the degree of hotness or coldness of a substance or object, typically measured using a thermometer in degrees Celsius or Fahrenheit.
If the temperature is read every 12 hours, then the time interval between two consecutive temperature readings is 12 hours.
To find the time of the eighth temperature reading, we need to add 12 hours for each of the previous seven temperature readings:
First reading: 11.15 am
Second reading: 11.15 am + 12 hours = 11.15 pm
Third reading: 11.15 pm + 12 hours = 11.15 am (next day)
Fourth reading: 11.15 am (next day) + 12 hours = 11.15 pm (next day)
Fifth reading: 11.15 pm (next day) + 12 hours = 11.15 am (two days after the first reading)
Sixth reading: 11.15 am (two days after the first reading) + 12 hours = 11.15 pm (two days after the first reading)
Seventh reading: 11.15 pm (two days after the first reading) + 12 hours = 11.15 am (three days after the first reading)
Eighth reading: 11.15 am (three days after the first reading) + 12 hours =
11.15 pm (three days after the first reading)
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A town's population is currently 20,000. If the population doubles every 34 years, what will
the population be 68 years from now?
Answer:
Here, given
present population = 20000
according to question,
population gets double every 34 years
i.e P = 20000 × 2
= 40000
now,
P = 40000
T = 68-34 = 34
ie, again p is double
so, P = 40000×2
= 80000
Hence, the population after 68 years from now is 80000
1. Each letter in PENNSYLVANIA is written on a separate piece of paper and put into a
bag. You randomly choose a piece of paper from the bag.
a. What is the probability that you choose an N?
b. What is the probability that you choose an A?
c. What is the probability that you choose an E?
Answer:
A maybe
Step-by-step explanation: sorry if wrong
a. There are three N's in PENNSYLVANIA. The probability of choosing an N can be calculated as follows:
Probability of choosing an N = (Number of N's in the word) / (Total number of letters in the word)
Probability of choosing an N = 3 / 12
Probability of choosing an N = 1 / 4
Therefore, the probability of choosing an N is 1/4.
b. There are two A's in PENNSYLVANIA. The probability of choosing an A can be calculated as follows:
Probability of choosing an A = (Number of A's in the word) / (Total number of letters in the word)
Probability of choosing an A = 2 / 12
Probability of choosing an A = 1 / 6
Therefore, the probability of choosing an A is 1/6.
c. There is only one E in PENNSYLVANIA. The probability of choosing an E can be calculated as follows:
Probability of choosing an E = (Number of E's in the word) / (Total number of letters in the word)
Probability of choosing an E = 1 / 12
Therefore, the probability of choosing an E is 1/12.
Megan flies a drone in a circular path around an object that is 180 feet west and 180 feet north of her position. The drone's path takes it over a point that is 220 feet east and 230 feet south of her.
Find an equation for the drone's path. (Assume Megan is located at the origin, with the horizontal axis running east-west and the vertical axis running north-south)
The drone's path follows the equation __________
When the drone passes due north of Megan's position, it will be ___________ feet north of her (round your answer to three decimal places).
To find the equation of the drone's path, we can first find the coordinates of the center of the circle that the drone is flying around. We can do this by finding the midpoint between the two points the drone passes over:
Midpoint in the x-direction: (220 ft - 180 ft)/2 = 20 ft to the right of the origin.
Midpoint in the y-direction: (230 ft - 180 ft)/2 = 25 ft above the origin.
Therefore, the center of the circle is located at (20, 25) ft.
The radius of the circle can be found by calculating the distance between the center of the circle and either of the two points the drone passes over:
Radius: sqrt((20-(-180))^2 + (25-180)^2) = sqrt(40000 + 15625) = 205 ft (rounded to the nearest whole number)
So the equation for the drone's path is:
(x - 20)^2 + (y - 25)^2 = 205^2
To find how far north of Megan's position the drone is when it passes due north, we can substitute x = 0 into the equation:
(0 - 20)^2 + (y - 25)^2 = 205^2
400 + (y - 25)^2 = 42025
(y - 25)^2 = 41625
y - 25 = +/-sqrt(41625)
y = 25 +/- 204.06
So the drone is either 229.06 ft north or 22.94 ft south of Megan's position when it passes due north. Rounded to three decimal places, the answer is 229.06 ft north.
2 ^3 • 2 ^4 is equal to _____.
Answer:
2^7 or 128
Step-by-step explanation:
When we multiply two powers with the same base, we add their exponents. In this case, the base is 2 and the exponents are 3 and 4.
So, 2^3 • 2^4 can be simplified as:
2^3 • 2^4 = 2^(3+4) = 2^7
Therefore, 2^3 • 2^4 is equal to 128.
Answer:128
Step-by-step explanation:
i assume that by ^ you meant power,
2^3=2*2*2=8
2^4=2*2*2*2=16
8*16=128
In ΔQRS, q = 3.9 cm, � m∠S=10° and � m∠Q=74°. Find the length of s, to the nearest 10th of a centimeter.
S thus measures around 2.77 centimetres in length.
What is the purpose of law of sines?The law of sines is frequently used to find the elusive side or angle of a triangle. This law can be used if precise triangle measurement combinations are given. ASA The objective is to identify the unknown side given two angles and an included side.
The Law of Sines can be used to determine the length of side s: s/sin(mS) = q/sin(mQ).
replacing the specified values:
s/sin(10°) = 3.9/sin(74°)
s ≈ sin(10°) × 3.9 ÷ sin(74°)
s ≈ 0.684 × 3.9 ÷ 0.961
s ≈ 2.77 cm (rounded to the nearest 10th)
S thus measures around 2.77 centimetres in length.
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algebra 1
what is the written formula for standard form
Answer: Ax+By=C This is the formula
A driver was fined for speeding in 100km/h zone driving 14km in 7m
Calculate the average speed of the car
Answer:
120km/h
Step-by-step explanation:
Distance=14km
Time =7m
A driver was fined for speeding in 100km/h
∴ we convert time into hours
Time =(7/60)h
Average speed of the car = total distance ÷total time
=14km×60/7h=120km/h which is greater than
100km/h
What is 2.655 as a mixed number in its simplest form. Please show your work.
In response to the question, we may say that Hence, 2 131/200 is the decimal mixed number in its most basic form.
what is decimal?The decimal number system is frequently used to express both integer and non-integer quantities. Non-integer values have been added to the Hindu-Arabic numeral system. The technique used to represent numbers in the decimal system is known as decimal notation. A decimal number consists of both a whole number and a fractional number. The numerical value of complete and partially whole quantities is expressed using decimal numbers, which are in between integers. The full number and the fractional part of a decimal number are separated by a decimal point. The decimal point is the little dot that appears between whole numbers and fractions. An example of a decimal number is 25.5.
We must separate the whole number and fraction components of 2.655 in order to change it into a mixed number. The integer portion of the decimal, which is 2 in this instance, represents the full number.
We take the total number and divide it by the decimal to determine the fractional portion.
2.655 - 2 = 0.655
The combined number is therefore 2 and 655/1000.
By dividing the numerator and denominator by their largest common factor, we may reduce the fraction to its simplest form and so make it easier to understand. The highest common factor between 655 and 1000 in this instance is 5.
655 ÷ 5 = 131
1000 ÷ 5 = 200
Hence, 2 131/200 is the mixed number in its most basic form.
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A deli has two platters of sandwiches. The first platter costs $29 and you get 2 ham sandwiches and 3 turkey sandwiches. The other platter costs $31 and you get 3 ham sandwiches and 2 turkey sandwiches. Let x represent the cost of each ham sandwich and y represent the cost of each turkey sandwich. What is the system of linear equations for the given scenario? What is the cost of each sandwich?
Solution is in da attachment mate!! :D
Step-by-step explanation:
that is a college question ?
x = cost of a ham sandwich
y = cost of a turkey sandwich
2x + 3y = 29
3x + 2y = 31
let's multiply the first equation by 3, abd the second equating by -2, and then we add them :
6x + 9y = 87
-6x - 4y = -62
------------------------
0 5y = 25
y = 25/5 = $5
let's use the original first equation to get x (but we could use also the second equation, it does not matter).
2x + 3×5 = 29
2x + 15 = 29
2x = 14
x = $7
each ham sandwich costs $7.
each turkey sandwich costs $5.
The graph of f ( x ) = − 1 /2 ( 1 /2 ) ^x − 3 + 5 is shifted downwards 5 units, and then shifted left 3 units, stretched vertically by a factor of 4 , and then reflected about the x -axis. a . What is the equation of the new function, g ( x ) ? g ( x ) = b . What is the y -intercept? ( , ) c . What is the domain? d . What is the range?
Answer: a. To shift the graph of f(x) downward 5 units, we subtract 5 from the function: f(x) - 5. To shift it left 3 units, we replace x with x + 3: f(x + 3) - 5. To stretch it vertically by a factor of 4, we multiply the entire function by 4: 4[f(x + 3) - 5]. Finally, to reflect it about the x-axis, we take the negative of the function: -4[f(x + 3) - 5]. Therefore, the equation of the new function g(x) is:
g(x) = -4[1/2^(x+3) - 5]
b. To find the y-intercept, we set x = 0 in the equation of g(x):
g(0) = -4[1/2^(0+3) - 5] = -4[1/8 - 5] = -4[-39/8] = 195/2
Therefore, the y-intercept is (0, 195/2).
c. The domain of g(x) is all real numbers, since there are no restrictions on x.
d. To find the range of g(x), we first observe that the function is decreasing and asymptotic to y = -5 as x approaches infinity. This means that the range of g(x) is all real numbers less than or equal to -5.
Step-by-step explanation:
describe how a graph would look for the solution set for the inequality in problem 5. describe what the solution means and how the price of the balloons bought will affect the amount in the budget.
A)
i) the inequality to show the number of ballons that the dance committee can buy is: 0.80b + 65 ≤ 125
ii) solving the inequality above, we arrive at b ≤ 75
B) The graph is attached accordingly.
C) See the description of the solution below.
Let's start by defining our variables. Let b be the number of balloons that the dance committee could buy.
The cost of b balloons is $0.80b. We want to make sure that the cost of the balloons plus the amount already spent on decorations ($65) is less than or equal to the budget of $125. So we can write the following inequality:
0.80b + 65 ≤ 125
Now we can solve for b:
0.80b + 65 ≤ 125
0.80b ≤ 125 - 65
0.80b ≤ 60
b ≤ 75
Therefore, the dance committee can buy up to 75 balloons to stay within their budget.
To graph the solution set, we can plot b on the horizontal axis and shade the region to the left of b = 75, since b must be less than or equal to 75.
The solution set represents all possible values of b that satisfy the inequality. In this case, the solution set is b ≤ 75, which means that the dance committee can buy up to 75 balloons and still stay within their budget.
As the number of balloons increases, the cost of the balloons also increases, and the amount of money left in the budget decreases.
Therefore, the more balloons the dance committee buys, the less money they will have left for other decorations or expenses.
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Full Question:
Since the above question is incomplete, it appears you are referring to the question below.
The dance committee has a budget of $125 to decorate the gym for a spring dance. They already spent $65. Some members want to buy helium balloons that cost $0.80 each.
A) Write and solve an inequality to show the number of balloons that the dance committee could buy.
B) Graph the solution set for the inequality.
C) Describe what the solution means and how the number of balloons affects the amount in the budget.
will the product of 2 numbers increase or decraese and by what percent if one of them is increased by 50% and the other one is decraesed by 50%
Answer: Let's assume the two original numbers to be x and y.
If one of them is increased by 50%, then the new value will be 1.5x, and if the other one is decreased by 50%, the new value will be 0.5y.
The product of the two new numbers will be:
1.5x * 0.5y = 0.75xy
So, the new product is 0.75 times the original product. This means the product of the two numbers has decreased by 25%.
To summarize:
If one number is increased by 50% and the other number is decreased by 50%, the product of the two numbers will decrease by 25%.
The new product is 0.75 times the original product.
Brainiest is appreciated (:
What is In 5 + ln 7 + 2ln 6
Answer: The answer to this equation is In (252) + 5.
Step-by-step explanation:
To solve this equation, you will need to first apply the logarithm power identity.
Now evaluate the exponent.
5 + In (7) + In (6^2)
5 + In (7) + In (36)
Apply the logarithm power identity again to the rest of this equation.
5 + In (7) + In (36)
5 + In (7 x 36)
After that, simplify the expression.
-Multiply the numbers & rearrange the terms
5 + In(7 x 36)
In(252) + 5
Therefore, your answer for this equation would be In(252) + 5.
Hope this helps Tekayla!Alyssa Wagner
Middle School Srudent
Please help me with this math problem!!
Multiply.
4 1/3 x 2 3/4
7 1/12
8 1/4
11 11/12
i dont know
Answer:
11 11/12
Step-by-step explanation:
You can change these "mixed numbers" (a big whole numbers and also a fraction) to "improper fractions" (a single fraction with a bigger number on top and a smaller number on the bottom)
4 1/3 × 2 3/4
see image
13/3 × 11/4
Multiply straight across, top×top and bottom×bottom.
see image.
Change back to a mixed number by dividing.
The multiplication of 4 1/3 x 2 3/4 is 11 11/12.
The correct option is C.
What is an improper fraction?A fraction that has the numerator higher than or equal to the denominator is said to be an improper fraction.
To multiply 4 1/3 and 2 3/4, we can first convert them to improper fractions:
4 1/3 = 13/3
2 3/4 = 11/4
Then we can multiply the fractions by multiplying the numerators and denominators separately:
(13/3) x (11/4) = (143/12)
Finally, we can convert the improper fraction back to a mixed number if desired:
143/12 = 11 11/12
Therefore, the answer is 11 11/12.
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What is the result of subtracting 1 and 1/2 from the sum of 4 and 2/3 and 5 and 2/5
Answer:
the result of subtracting 1 and 1/2 from the sum of 4 and 2/3 and 5 and 2/5 is 257/30 = 8 and 39/40.
Step-by-step explanation:
To find the result of subtracting 1 and 1/2 from the sum of 4 and 2/3 and 5 and 2/5, we need to first add the two summands:
4 and 2/3 + 5 and 2/5
To add these mixed numbers, we first need to find a common denominator. The least common multiple of 3 and 5 is 15.
4 and 2/3 can be written as an improper fraction with denominator 3:
4 and 2/3 = 4 x 3/3 + 2/3 = 12/3 + 2/3 = 14/3
5 and 2/5 can be written as an improper fraction with denominator 5:
5 and 2/5 = 5 x 5/5 + 2/5 = 25/5 + 2/5 = 27/5
Now we can add the two fractions with a common denominator of 15:
14/3 + 27/5 = (14 x 5)/(3 x 5) + (27 x 3)/(5 x 3) = 70/15 + 81/15 = 151/15
So, the sum of 4 and 2/3 and 5 and 2/5 is 151/15.
Now we can subtract 1 and 1/2 from this sum:
151/15 - 1 1/2
To subtract mixed numbers, we first need to convert 1 and 1/2 to an improper fraction:
1 and 1/2 = 1 x 2/2 + 1/2 = 2/2 + 1/2 = 3/2
Now we can subtract the fractions with a common denominator of 15:
151/15 - 3/2 = (151 x 2)/(15 x 2) - (3 x 15)/(2 x 15) = 302/30 - 45/30 = 257/30
Therefore, the result of subtracting 1 and 1/2 from the sum of 4 and 2/3 and 5 and 2/5 is 257/30.
I will mark you brainiest!
Which quadrilateral has exactly one pair of parallel sides?
A) rhombus
B) Kite
C) trapezoid
D) parallelogram
Find the ordered pair solutions for the system of equations. ([?], f(x) = x² + 1 f(x) = -x + 3 ) and ( Enter the smallest x first.
The ordered pair solutions for the system of equations are (-2, 5) and (1, 2).
How to determine ordered pair?To determine if an ordered pair is a solution to two systems of equations, substitute the values of the variables into each equation. If an ordered pair makes both equations true, it is the solution of the system.
To find the ordered pair solutions for the system of equations, we need to solve the two equations simultaneously.
f(x) = x² + 1 ...(1)
f(x) = -x + 3 ...(2)
Setting the two equations equal to each other, we get:
x² + 1 = -x + 3
Rearranging this equation, we get:
x² + x - 2 = 0
Factoring this quadratic equation, we get:
(x + 2)(x - 1) = 0
Therefore, the solutions for x are x = -2 and x = 1.
Substituting these values of x into either equation (1) or (2), we get:
For x = -2: f(-2) = (-2)² + 1 = 5, and f(-2) = -(-2) + 3 = 5.
For x = 1: f(1) = 1² + 1 = 2, and f(1) = -1 + 3 = 2.
Therefore, the ordered pair solutions for the system of equations are (-2, 5) and (1, 2).
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The probability that it is Friday and that a student is absent is 0.03. Since there are 5 school days in a week, the probability that it is Friday is 0.2. What is the probability that a student is absent given that today is Friday? This is an example of:
A) conditional probability.
B) supplemental probability.
C) complementary probability.
D) standard deviation probability.
This problem involves finding the probability of an event (a student being absent) given that another event has already occurred (today is Friday). This is an example of conditional probability.
Therefore, the correct answer is A) conditional probability.
Answer:
A.
Step-by-step explanation:
This is a conditional probability. None of the other choices make sense, but the most distinct word is "given". This is a sure sign of a conditional probability, or Bayes Theorem. The condition A is that it is Friday. Event B is that a student is absent. P (A|B)
Given f(x) = 2x2 + 9x − 1 and g(x) = −x − 4, identify g(f(−3)).
Answer:
g(f(-3)) = 6.
Step-by-step explanation:
To obtain the value of f(-3), we must first determine g(f(-3)), which requires changing x in the expression for f(x) to -3:
f(x) = 2x^2 + 9x - 1
f(-3) = 2(-3)^2 + 9(-3) (-3) - 1\s= 2(9) (9) - 27 - 1\s= 18 - 27 - 1\s= -10
Knowing that f(-3) = -10 allows us to replace it in the expression for g(x):
g(x) = -x - 4
g(f(-3)) = g(-10) (-10)
Now, if we replace x in g(x) with -10, we obtain:
g(f(-3)) = g(-10) = -(-10) (-10) - 4 = 10 - 4 = 6
Hence, g(f(-3)) = 6.
Answer:
g(f(-3))=6
Step-by-step explanation:
To calculate g(f(-3)), we must first determine the value of f(-3), and then we must insert that value into g(x) to obtain the result.
By adding x = -3 to the formula for f(x), we may obtain f(-3).
f(-3) = 2(-3)
² + 9(-3) - 1
f(-3) = 2(9) - 27 - 1
f(-3) = 18 - 28
f(-3) = -10
Knowing that f(-3) = -10 allows us to replace it in the formula for g(x):
g(f(-3)) = g(-10) = -(-10) (-10) - 4 = 10 - 4 = 6
Hence, g(f(-3)) = 6.
CAN SOMEONE HELP WITH THIS QUESTION?
Answers:
[tex]\text{Derivative: } \ \ \frac{dy}{dx} = \frac{-260x^{9} - 156x^{25}y}{6x^{26}+7y^6}\\\\ \text{Tangent line at (1,1) is: } \ y = -32x + 33\\\\[/tex]
==========================================================
Work Shown:
Let's determine the derivative dy/dx.
Part 1
[tex]26x^{10} + 6x^{26}y+y^7 = 33\\\\ \frac{d}{dx}(26x^{10} + 6x^{26}y+y^7) = \frac{d}{dx}(33)\\\\ \frac{d}{dx}(26x^{10}) + \frac{d}{dx}(6x^{26}y)+\frac{d}{dx}(y^7) = 0\\\\ 10*26x^{10-1} + \frac{d}{dx}(6x^{26})y+(6x^{26})*\frac{dy}{dx}+7y^6\frac{dy}{dx} = 0\\\\[/tex]
Part 2
[tex]260x^{9} + 26*6x^{26-1}y+6x^{26}*\frac{dy}{dx}+7y^6\frac{dy}{dx} = 0\\\\ 260x^{9} + 156x^{25}y+6x^{26}*\frac{dy}{dx}+7y^6\frac{dy}{dx} = 0\\\\ 260x^{9} + 156x^{25}y+(6x^{26}+7y^6)\frac{dy}{dx} = 0\\\\ (6x^{26}+7y^6)\frac{dy}{dx} = -260x^{9} - 156x^{25}y\\\\ \frac{dy}{dx} = \frac{-260x^{9} - 156x^{25}y}{6x^{26}+7y^6}\\\\[/tex]
There are many other possible ways to express the dy/dx expression.
GeoGebra and WolframAlpha are two useful tools to help verify the answer. Make sure you use the CAS mode in GeoGebra.
-------------------------------------------
Part 3
Now that we know dy/dx, we can determine the slope of the tangent at any point (x,y) on the implicit function curve.
Plug in x = 1 and y = 1.
[tex]\frac{dy}{dx} = \frac{-260x^{9} - 156x^{25}y}{6x^{26}+7y^6}\\\\ \frac{dy}{dx} = \frac{-260(1)^{9} - 156(1)^{25}(1)}{6(1)^{26}+7(1)^6}\\\\ \frac{dy}{dx} = \frac{-260(1) - 156(1)(1)}{6(1)+7(1)}\\\\ \frac{dy}{dx} = \frac{-260 - 156}{6+7}\\\\ \frac{dy}{dx} = \frac{-416}{13}\\\\ \frac{dy}{dx} = -32\\\\[/tex]
The slope of the tangent line at (1,1) is m = -32.
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Part 4
Apply the point-slope formula to determine the tangent line.
[tex]m = -32 = \text{ slope}\\(x_1,y_1) = (1,1) = \text{the point the tangent line goes through}[/tex]
So,
[tex]y - y_1 = m(x - x_1)\\\\y - 1 = -32(x - 1)\\\\y - 1 = -32x + 32\\\\y = -32x + 32 + 1\\\\y = -32x + 33\\\\[/tex]
I will mark you brainiest!
What is the area of a triangle with a base of 23 feet and a height of 6 feet?
A) 26 ft2
B) 58 ft2
C) 69 ft2
D) 138 ft2
Answer:
C) 69
Step-by-step explanation:
23 x 6 ÷ 2 =69feet2
ok!
A certain virus infects one in every 300 people. A test used to detect the virus in a person is positive
90% of the time if the person has the virus and 5% of the time if the person does not have the virus.
(This 5% result is called a false positive.) Let A be the event "the person is infected" and B be the
event "the person tests positive",
a) Find the probability that a person has the virus given that they have tested positive, i.e. find
P(A|B). Round your answer to the nearest tenth of a percent and do not include a percent sign.
P(A|B)=
%
b) Find the probability that a person does not have the virus given that they test negative, i.e. find
P(A'|B'). Round your answer to the nearest tenth of a percent and do not include a percent sign.
P(A'|B')=
Answer:
b i think let me know if im right
Step-by-step explanation:
i need the answer for this question
The value of the functions are;
f(3) = - 3
g(5) = -77
What is a function?A function can be defined as an equation or expression hat shows the relationship between two variables.
These variables are termed;
The dependent variableThe independent variableFrom the information given, we have that;
f(x) = -5x + 2
g(x) = -3x²- 2
To determine the function, f(3), and g(5), we have to substitute the value of x as 3 in the function f(x) and the value of x as 5 in the function g(x).
We have;
f(3) = -5(3) + 2
expand the bracket
f(3) = - 13
For the second function;
g(5) = - 3(5)² -2
g(5) = -77
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Which of the following equations is the best model for a line of fit for the data?
ŷ = −1.34x + 21.5
ŷ = 1.34x + 21.5
ŷ = −0.75x + 17
ŷ = 0.75x + 17
The correct option is (a) ŷ = -1.34x+21.5 , that is the best model to fit the scatter plot.
What is Scatter plot?A scatter plot (or scatter chart, scatter graph) uses dots to represent values for two(2) different numeric variables. The position of each dot on horizontal and vertical axis indicates values for an individual data point.
The model of the equation best for the plot is,
ŷ = -1.34x+21.5
At point (1,20),
ŷ = -1.34x+21.5
20 = (-1.34 × 1) + 21.5
20 ≈ 20.15
At point (3,19),
ŷ = -1.34x+21.5
19 = (-1.34 × 3) + 21.5
19 ≈17.45
At point (5,15),
ŷ = -1.34x+21.5
15 = (-1.34 × 5) + 21.5
15 ≈ 14.75
The model ŷ = -1.34x+21.5 is giving the best estimation.
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9 + 6g + 1 = 100 please I need help these are difficult
Answer:
So g would be 15.