please help with #6, thank
you!
6. Find the derivative of the following. *SIMPLIFY your answers (4 Marks Each] a) y = (3x/V5x2-x2)3 b) f(x) = (5x – 3)5(3x - 1)3
Answers
The derivative of the given function is equal to y = (3x/√(5x^2 - x^2))^3 implies y' =0 and for f(x) = (5x – 3)^5(3x - 1)^3 is f'(x) = 9(5x – 3)^5 × (3x – 1)^2 + 25(3x – 1)^3 × (5x – 3)^4.
The derivative of y,
Use the chain rule and the power rule.
y = (3x/√(5x^2 - x^2))^3
= (3x/√(4x^2))^3
= (3x/2x)^3
= (3/2)^3
= 27/8
Derivative of y is equal to,
y' = 0,
since the derivative of a constant is zero.
Derivative of f(x) = (5x – 3)^5(3x - 1)^3,
Use the product rule and the chain rule.
Using the product rule, we get,
f'(x) = (5x – 3)^5 d/dx(3x - 1)^3 + (3x - 1)^3 d/dx(5x – 3)^5
Now, use the chain rule to find the derivatives of the individual terms.
Let u = 5x – 3 and v = 3x – 1. Then we have:
d/dx(u^5)
= 5u^4 × d/dx(u)
= 5(5x – 3)^4 × 5
= 25(5x – 3)^4
d/dx(v^3)
= 3v^2 × d/dx(v)
= 9(3x – 1)^2
Substituting these values back into the product rule formula, we get,
f'(x) = (5x – 3)^5 × 9(3x – 1)^2 + (3x – 1)^3 × 25(5x – 3)^4
Simplifying, we get,
f'(x) = 9(5x – 3)^5 × (3x – 1)^2 + 25(3x – 1)^3 × (5x – 3)^4
Therefore, the derivative of f(x) = (5x – 3)^5(3x - 1)^3 is f'(x) = 9(5x – 3)^5 × (3x – 1)^2 + 25(3x – 1)^3 × (5x – 3)^4
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The given question is incomplete, I answer the question in general according to my knowledge:
Find the derivative of the following. SIMPLIFY your answers
a) y = (3x/√5x^2-x^2)^3
b) f(x) = (5x – 3)^5(3x - 1)^3
Related Questions
Find the value of x
Answers
Answer:
11
Step-by-step explanation:
The breadth of a box is two third of its length and height is one third of its length. if the volume of box is 48m³, find the area of the base of the box.
Answers
Answer:
Step-by-step explanation:
To find the area of the base of the box, we need to determine the length, breadth, and height of the box. We can set up a system of equations to represent the given information:
breadth = 2/3 * length
height = 1/3 * length
volume = length * breadth * height
Substituting the second equation into the third equation, we get:
volume = length * breadth * (1/3 * length)
= length^2 * (2/3) * (1/3)
= (2/9) * length^2
= 48
= 2^4 * 3
Solving for length, we find that length = 6. Plugging this value back into the first equation, we find that breadth = 4.
Therefore, the area of the base of the box is length * breadth = 6 * 4 = 24 square meters.
1. An equilateral triangle was reflected
relatively to the line passing through its
side. What is the result?
A. The second triangle has become
bigger than the initial triangle.
B. It turned into a versatile triangle.
C. The second triangle has become
smaller than the initial triangle.
D. The second triangle is the same size
as the initial triangle.
Answers
The second triangle will have the same side lengths and angles as the initial triangle.
The correct option is D.
The reflection of an equilateral triangle relative to the line passing through its side results in a new equilateral triangle that is the same size as the initial triangle. Therefore, the correct answer is D: The second triangle is the same size as the initial triangle.
When a figure is reflected across a line, every point on the figure is flipped to the opposite side of the line, maintaining the same distances and angles. In the case of an equilateral triangle, each side is reflected to the opposite side of the line, resulting in a new equilateral triangle with the same side lengths and angles.
The property of an equilateral triangle is that all three sides are equal in length, and all three angles are equal to 60 degrees. The reflection does not alter these properties. Therefore, the second triangle will have the same side lengths and angles as the initial triangle.
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Which of the following statements about hypothesis testing are TRUE? [Select ALL that are TRUE.] Type I and Type II Errors represent mistakes a statistician makes when performing statistical analysis, such as applying the central limit theorem when it is not justified a hypothesis test can conclude that there is sufficient evidence to accept the null hypothesis the alternative hypothesis is accepted when the null hypothesis is rejected statistical hypotheses about population parameters are proven true or false with 100% certainty a hypothesis test can conclude that there is sufficient evidence to reject the null hypothesis the probability of making a Type I Error and the probability of making a Type II Error both decrease when the critical region is made smaller the probability of making a Type I Error and the probability of making a Type II Error both decrease when the sample size is increased the null hypothesis involves setting an unknowable population parameter EQUAL TO a claimed value
Answers
The following statements are TRUE about hypothesis testing ;
Type I and Type II errors represent mistakes a statistician makes when performing statistical analysis, such as applying the central limit theorem when it is not justified.The alternative hypothesis is accepted when the null hypothesis is rejectedA hypothesis test can conclude that there is sufficient evidence to reject the null hypothesisThe probability of making a Type I Error and the probability of making a Type 2 error both decrease when the critical region is made smallerhypothesis testing is known as statistical inference type that uses data from a sample to develop inferences about a population parameter or population probability distribution. An educated guess is first made on the parameter or distribution.
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Mallory was driving 70 miles per hour and has a stopping distance of 245 feet. What is the value of the constant of proportionality k?
Answers
Answer:
a
Step-by-step explanation:
72,64,145
You are a civil engineer working on the design of a new
green space in your city. The space will include gardens,
playgrounds, and picnic areas. One section of the park will
be in the shape of a right triangle. A diagram of the
requirements for the triangular space is shown below.
2x+2 yards
2x yards
2x+4 yards
1. Explain what you know about the space you will be designing. List at least three pieces
of information. (2 points)
Answers
consider the following binomial experiment: the probability that a fuse produced by a certain company will be defective is 37⁄100 . if 500 fuses are produced each day, how many can we expect to find each day that are defective ? a) 189 b) 187 c) 185 d) 183 e) 188 f) none of the above.
Answers
We can expect to find 185 defective fuses each day.
The correct answer is c) 185.
At first we have to find the expected number of defective fuses each day, we can use the formula for the expected value of a binomial distribution:
Expected Value (μ) = n * p
where:
n = number of trials (in this case, the number of fuses produced each day) = 500
p = probability of success (in this case, the probability that a fuse is defective) = 37/100 = 0.37
Expected Value (μ) = 500 * 0.37 = 185
So, we can expect to find 185 defective fuses each day.
The correct answer is c) 185.
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solve the system by substitution 3x-y=10 2x=y
Answers
Answer
X=10 and y=20
Step-by-step explanation:
since y=2x, you need to substitute that into the equation to get:
3x-(2x)=10
And evaluate:
x=10
Then substitute 10 into the equation: 2x=y:
2(10)=y
evaluate:
20=y
Now go back to the original equation to check your answer and substitute the values in:
3(10)-(20)=10
30-20=10
10=10
steps
1) substitute 2x into the equation for Y
2) combine like terms ( 3x and -2x which equals 1x or x)
3) solve for x’s value (10)
4) plug in x’s value to solve for y
5) plug values into original equation to check work
If you multiply a number by 3 and then subtract 5, you will get 40 what is the number
Answers
Answer:
Number = 15.
Step-by-step explanation:
Given : If you multiply a number by 3 and then subtract 5, you will get 40.
To find : what is the number.
Solution : We have given if you multiply a number by 3 and then subtract 5, you will get 40.
According to question :
Let the number = x
Multiply is with 3 = 3x
Subtract 5 from it we get 40 .
3x -5 = 40
On adding both sides by 5
3x = 45 .
On dividing both sides by 3
x = 15.
Therefore, Number = 15.
Answer:
15
Step-by-step explanation:
3×y-5=40
3y-5=40
3y=40+5
3y=45
y=45÷3
y=15
t has a value of 5/2. p is the sum of t and v, and p has a value of 0. What is the value of v?
Answers
Answer:
Step-by-step explanation:
If p = t + v and t is 5/2 and p is 0, then
0 = 5/2 + v and
v = -5/2
The diagram shows a solid metal cuboid.
The areas of three of the faces are marked on
the diagram.
The lengths, in cm, of the edges of the cuboid
are whole numbers.
The metal cuboid is melted and made into cubes.
Each of the cubes has sides of length 2.5 cm.
Work out the greatest number of these cubes that can be made.
You must show your working.
Answers
Answer:
6 cubes
Step-by-step explanation:
Considering the given cuboid, it can be deduced that;
length of the cuboid = 7 cm
width of the cuboid = 3 cm
height of the cuboid = 5 cm
Thus,
volume of the cuboid = length x width x height
= 7 x 3 x 5
= 105 cubic centimetres
The cubes has sides of length 2.5 cm.
volume of each cube = length x width x height
= 2.5 x 2.5 x 2.5
= 15.625 cubic centimetres
The greatest number of cubes that can be made = \(\frac{105}{15.625}\)
= 6.72
The greatest number of cubes that can be made from the cuboid is 6.
12 ft
VA
7 ft
9:ft
Find the area.
15 ft
7 ft
Remember: A = πr²
A = [?] ft²
Round to the nearest
hundredth.
Use 3.14 for T.
![12 ftVA7 ft9:ftFind the area.15 ft7 ftRemember: A = rA = [?] ftRound to the nearesthundredth.Use 3.14](https://i5t5.c14.e2-1.dev/h-images-qa/contents/attachments/9g8UYR9n7rnPbheKQxbmCMPTdcp2WlWj.png)
Answers
Adding the values of area of 105, 56.52, and 244.53, we get: 105 + 56.52 + 244.53 = 406.05sq unit
The area of different shapes in the given figure are :-
Area of rectangle having length of 15 And width of 7
To find the area of a rectangle, we simply multiply the length by the width. So, for a rectangle with a length of 15 and a width of 7, the area would be:
Area = length x width
Area = 15 x 7
Area = 105
Therefore, the area of the rectangle would be 105 square units.
Area of semi circle having radius of 6
The formula for the area of a semicircle is:
Area = (π x r2) / 2
Where "r" is the radius of the semicircle and π (pi) is a mathematical constant approximately equal to 3.14.
Substituting the value of radius (r) as 6 in the above formula, we get:
Area = (π x 6²) / 2
Area = (3.14 x 36) / 2
Area = 56.52 square units (approx)
Therefore, the area of the semicircle with a radius of 6 would be approximately 56.52 square units.
Area of cone having height of 9 And slant height of 7 and diameter 12
If the diameter of the cone is 12, then the radius (r) is equal to half of the diameter, i.e., r = 12/2 = 6 units.
Using the Pythagorean theorem, we can find the height (h) of the cone, which is given by:
h = √(ℓ² - r²)
Substituting the values of slant height (ℓ) as 7 and radius (r) as 6, we get:
h = √(7² - 6²)
h = √(49 - 36)
h = √13
Therefore, the height of the cone is √13 units.
Now, we can use the formula for the surface area of a cone:
Surface Area = πr²+ πrℓ
Substituting the values of radius (r) as 6 and slant height (ℓ) as 7, we get:
Surface Area = π(6)² + π(6)(7)
Surface Area = 36π + 42π
Surface Area = 78π
Therefore, the surface area of the cone with a height of 9, slant height of 7, and diameter of 12 would be 78π square units (approximately 244.53 square units if we use the approximation π = 3.14).
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2(x+9)=4(x+7)+2 what the answer?
Answers
Answer:
The answerrrrrrrrrrr is x=-6
Answer: =-2x - 8
Step-by-step explanation:
Find the value of x
x=
Answers
The value of x in terms of the length of the chord BC is x = (1/2) * arcsin(BC / (2 * r)) - 30 degrees
Draw a diagram of the circle and label the given points and segments.
Identify the relevant circle properties: Recall the properties of circles such as the radius, diameter, circumference, and central angle. Identify any angles or lengths that can be determined from the given information.
Use the tangent-chord theorem: Since AD is tangent to the circle, we can use the tangent-chord theorem to find that angle ADB is equal to angle ABD.
This implies that triangle ABD is an isosceles triangle.
Use the properties of isosceles triangles: Since triangle ABD is isosceles, we know that angle BAD is equal to angle ADB.
We also know that the sum of the angles in a triangle is 180 degrees.
Therefore, angle ABD is equal to (180 - 2x) degrees.
Use the angle sum property: Since A, B, C, and D are points on the circle, angle BAC is equal to half of the central angle BOC.
Therefore, angle BOC is equal to 2 * angle BAC.
Use the angle subtraction property: Since angle ABD is an exterior angle of triangle BCD, we know that angle ABD is equal to the sum of angles BCD and BDC.
Therefore, (180 - 2x) degrees is equal to (2 * angle BAC) + angle BDC.
Use the angle sum property again: Since B, C, and D are points on the circle, angle BDC is equal to half of the central angle BOC.
Therefore, angle BDC is equal to angle BAC.
Substituting this value into the equation from step 6, we get (180 - 2x) degrees
= (2 * angle BDC) + angle BAC
= 2 * angle BAC + angle BAC
= 3 * angle BAC.
Therefore, angle BAC is equal to (180 - 2x) / 3 degrees.
2 * angle BAC = 2 * (180 - 2x) / 3 degrees.
Use the chord length formula: Using the chord length formula, we can find that BC
= 2 * r * sin(angle BOC / 2), where r is the radius of the circle.
Substituting the value of angle BOC from step 9, we get BC = 2 * r * sin[(2 * (180 - 2x) / 3) / 2]
= 2 * r * sin[(180 - 2x) / 3] .
Solve for x:
We need to express x in terms of BC, so we can use the formula from step 10 to get 2 * r * sin[(180 - 2x) / 3] = BC.
Solving for x gives x = (1/2) * arcsin(BC / (2 * r)) - 30 degrees.
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a survey conducted on 1,000 canadians found that 700 of them refused to receive the h1n1 vaccination. construct a 95% confidence interval of the estimated proportion of canadians who refused the vaccination.
Answers
A 95% confidence interval for the estimated proportion of Canadians who refused the H1N1 vaccination can be calculated as follows:
Let p be the true proportion of Canadians who refused the vaccination.
The sample proportion is estimated by:
p_hat = 700 / 1000 = 0.7
The standard error of the sample proportion is:
SE = sqrt(p_hat * (1 - p_hat) / 1000) = sqrt(0.7 * 0.3 / 1000) = 0.0247
Using a normal approximation and a z-score of 1.96 (corresponding to a 95% confidence level), the confidence interval can be calculated as:
p_hat +/- z * SE = 0.7 +/- 1.96 * 0.0247 = [0.6511, 0.7489]
So, with 95% confidence, we can estimate that the true proportion of Canadians who refused the H1N1 vaccination lies between 0.6511 and 0.7489.
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Simplifier chacune des expressions suivantes et identifier la nature du nombre obtenu.
= 2 +
2
3
; =
2
5
+ 7; = (√3 + 1)(√3 − 1) ; = (√5 + 1)²
Answers
Answer:its 5
Step-by-step explanation: cuz
when graphing two variables, if the line slopes upward as you move from left to right then the variables exhibit a positive relationship. true or false
Answers
Yes, when graphing two variables and observing an upward slope as you move from left to right, it indicates a positive relationship between the variables.
Do upward-sloping lines indicate a positive relationship between variables?As one variable increases, the other variable also tends to increase. This positive correlation can be visually represented by a line that slopes upward in a graph. It implies that there is a direct and proportional relationship between the variables being studied.
But downward-sloping line indicate a negative relationship, where as one variable increases, the other variable tends to decrease. The slope of the line provides insights into the magnitude and direction of the relationship between the variables.
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write out the first 4 terms of the sequence (bn)n>=1 of partial sums of the sequence 4,12,20,28 determain a recursive defintion for bn 1
Answers
The first 4 terms are 4 ,16,36 and 64 of the sequence (bn)n>=1 of partial sums of the sequence.
To find the first 4 terms of the sequence (bn)n≥1, we will calculate the partial sums as follows:
1. b1 = 4 (the first term)
2. b2 = b1 + 12 = 4 + 12 = 16 (sum of the first two terms)
3. b3 = b2 + 20 = 16 + 20 = 36 (sum of the first three terms)
4. b4 = b3 + 28 = 36 + 28 = 64 (sum of the first four terms)
So, the first 4 terms of the sequence (bn)n≥1 are 4, 16, 36, 64.
Now let's determine a recursive definition for bn. Notice that the difference between each term in the original sequence is 8 (12 - 4, 20 - 12, and 28 - 20). So, we can write the recursive definition as:
bn = bn-1 + 8n, for n > 1, and b1 = 4 (the first term).
This recursive definition can be used to find any term in the sequence (bn)n≥1 of partial sums.
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bella sits 2 seats away from ella danielle does not sit next to ella charlie sits at a end of the table freddy sits between bella and ella find where he is by 9.8-8.23 then round where does adam sit and it what order do the 6 kids sit in
Answers
The order in which the kids sit is an illustration of arrangement.
Adam sits after DanielleThe order in which the 6 kids sit is: Danielle, Adam, Ella, Freddy, Bella and CharlieWe understand that: Bella is two seats away from Ella.
This arrangement is represented as: (E)_ (B)
Freddy sits between Bella and Ella.
This arrangement is represented as: (E) (F) (B)
Danielle does not sit next to Ella, and Charlie is at the end of the table.
This arrangement is represented as: (D) _ (E) (F) (B) (C)
So, Adam will occupy the seat between Danielle and Ella
This arrangement is represented as: (D) (A) (E) (F) (B) (C)
Hence, the order in which the 6 kids sit is: Danielle, Adam, Ella, Freddy, Bella and Charlie
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How do I find 1/4 of 52
Answers
Answer:
13
Step-by-step explanation:
1/4 of 52 is actually telling us to multiply 1/4 by 52 over 1.
1/4×52/1
=13
(L3) Which triangle illustrates a centroid?
Answers
The centroid is a point of concurrency of the medians of a triangle. The medians are the line segments that connect each vertex of the triangle to the midpoint of the opposite side. The centroid is located at the intersection of the three medians, and it is often denoted by the letter G.
Every triangle has a centroid, and it is one of the most important points in a triangle. The centroid divides each median into two segments, with the segment connecting the vertex to the centroid being twice as long as the segment connecting the midpoint to the centroid. Therefore, the centroid is located two-thirds of the distance from each vertex to the midpoint of the opposite side.
To illustrate a triangle with a centroid, we can take any triangle and draw its three medians. The centroid is the point at which these three medians intersect. Any type of triangle, whether it is acute, obtuse, or right, will have a centroid. Therefore, any triangle can illustrate a centroid, and it is a fundamental concept in geometry that is used to solve many problems and prove theorems related to triangles.
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Is 1/2x-4 a function?
Answers
Answer:
Yes it is
Step-by-step explanation:
Each x value is represented by exactly one y value.
Find values of p for which the integral
∫10xpln(x)dx
converges and calculate the value of the integral for these values of p.
Answers
The integral ∫10x^p * ln(x) dx converges for all values of p except p = -1.
To determine the values of p for which the integral ∫10x^p * ln(x) dx converges, we need to consider the convergence of the integrand for different values of p. The integral will converge if the integrand is well-behaved and does not exhibit any divergence.
Let's analyze the integrand in two separate cases:
Case 1: p ≠ -1
When p ≠ -1, the integrand is well-defined for all x > 0. We can proceed with evaluating the integral.
∫10x^p * ln(x) dx = [x^(p+1) * ln(x)] / (p+1) + C
To calculate the value of the integral for a specific value of p, we can substitute the limits of integration into the antiderivative expression and evaluate the resulting expression.
Case 2: p = -1
When p = -1, the integrand becomes 10x^(-1) * ln(x), which poses a potential issue at x = 0. To determine if the integral converges for this case, we need to examine the behavior of the integrand near x = 0.
As x approaches 0, the expression ln(x) approaches negative infinity, which would cause the integrand to diverge. Therefore, for p = -1, the integral does not converge.
In summary, the integral ∫10x^p * ln(x) dx converges for all values of p except p = -1.
Please note that when evaluating the definite integral for specific limits of integration, you should substitute the limits into the antiderivative expression and then calculate the difference of the resulting expressions evaluated at the upper and lower limits.
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What number equal to 48
Answers
Answer:
The factor pairs of the number 48 are: 1 x 48, 2 x 24, 3 x 16, 4 x 12, and 6 x 8. When you multiply each of these factor pairs together, you get 48.
Step-by-step explanation:
1 x 48 = 48
2 x 24 = 48
3 x 16 = 48
4 x 12 = 48
6 x 8 = 48
HOPE IT'S HELP:)
find all the zeros of the equation 12x^2-64=-x^4
Answers
Answer:
{ -2, 2, - 4i, 4i }---------------
Given equation:
\(12x^2-64=-x^4\)Rearrange and factorize it:
\(x^4+12x^2-64=0\)\(x^4+16x^2-4x^2-64=0\)\(x^2(x^2+16)-4(x^2+16)=0\)\((x^2-4)(x^2+16)=0\)\((x+2)(x-2)(x^2+16)=0\)According to factors we got, there are two real and two imaginary zeros:
1) x = -22) x = 2x² = - 16 ⇒ x = ± 4i
3) x = 4i4) x = - 4iThe zeros of the equation 12\(x^2\) - 64 = -\(x^4\) are x = 2 and x = -2.
To find all the zeros of the equation 12\(x^2\) - 64 = -\(x^4\) , we can rearrange the equation to set it equal to zero and then solve for x.
First, let's rewrite the equation as \(x^4\) + 12\(x^2\) - 64 = 0.
Now, we can factor the equation.
Factoring a quadratic equation can be quite complex, so let's use a substitution to simplify it.
Let's substitute y = \(x^2\)
Substituting y = \(x^2\), we get \(y^2\) + 12y - 64 = 0.
Now we have a quadratic equation, which is easier to factor.
Factoring the quadratic equation, we have (y - 4)(y + 16) = 0.
Setting each factor equal to zero, we have two possible solutions: y - 4 = 0 and y + 16 = 0.
Solving for y in each equation, we find y = 4 and y = -16.
Now, we substitute back the value of y into our substitution equation y = \(x^2\).
For y = 4, we have \(x^2\) = 4, which gives us two solutions: x = 2 and x = -2.
For y = -16, we have \(x^2\) = -16. Since the square of any real number is always nonnegative, there are no real solutions for this case.
Therefore, the zeros of the equation 12\(x^2\) - 64 = -\(x^4\) are x = 2 and x = -2.
In summary, the equation has two real zeros: x = 2 and x = -2. The equation does not have any other real zeros.
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A rectangle with area of 16mx12m will be put onto a blueprint of scale 1:80, what is the area of the rectangle on the blueprint?
A. 300cm²
B. 350cm²
C. 450cm²
D. 400cm²
E. 500cm²
Answers
Step-by-step explanation:
First, we need to find the actual dimensions of the rectangle in centimeters by converting meters to centimeters and multiplying:
Length = 12m = 1200cm
Width = 16m = 1600cm
Next, we need to find the dimensions of the rectangle on the blueprint. Since the scale is 1:80, we can divide the actual dimensions by 80 to get the blueprint dimensions:
Length on blueprint = 1200cm ÷ 80 = 15cm
Width on blueprint = 1600cm ÷ 80 = 20cm
Finally, we can calculate the area of the rectangle on the blueprint by multiplying the length and width:
Area on blueprint = 15cm x 20cm = 300cm²
Therefore, the answer is A. 300cm².
What values are distributed along the x-axis for a sampling distribution of the sample mean?
Answers
The sample means are distributed along the x-axis for a sampling distribution of a sample mean.
What is a sample mean?A sample mean is an average of a set of data, that can be used to calculate the central tendency, standard deviation and the variance of a data set.
Now,
In a two-dimensional graph, (with two axes), generally the independent variable is plotted on the x-axis and the dependent variable is plotted on the y-axis. Here, in sample mean, the average set of data is distributed on the x-axis as it is the independent value for a sampling distribution.To learn more about sample mean, refer to the link:https://brainly.com/question/12892403
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what is the answer someone help
Answers
Answer: The answer is 4
Step-by-step explanation: First multiply 1/6 by its opposite or 6. Next multiply 6 by 4/6 and you would get 4. then check your answer by filling in the blank. The answer is then complete.
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One of the legs of a right triangle measures 17 cm and its hypotenuse measures 19 cm. Find the measure of the other leg. If necessary, round to the nearest tenth.
Answers
The length of the other leg is 8.48 cm
What is Pyhtagorean Theorem?
The Pythagorean theorem states that the sum of the squares on the legs of a right triangle equals the square on the hypotenuse (the side opposite the right angle)
Solution:
Given that:
Length of One Leg = 17 cm
Length of Hypotenuse = 19 cm
To Find:
Length of the other leg
= We know that by pythagorean theorem
\(base^{2} + length^{2} = hypotenuse^{2}\)
17*17 + x^2 = 19*19
289 + x^2 = 361
x^2 = 72
x = 8.48 cm
The length of the other leg is 8.48 cm
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solve for 1/3(2x-y)=z for x
Answers
Answer:
The answer is 7.
Step-by-step explanation:
Cant you math bro?