The distribution of GPAs is normally distributed with a mean of 2.7 pounds and a standard deviation of 0.3. Approximately what percentage of students has GPAs above 3.0?

Answers

Answer 1

Answer: The best answer to this statistic question would be 15.7% or, if rounded off, 16%. This is because those students who have GPAs are approximately at least 1 standard deviation away from the mean and more - which means that 84% of the GPAs are less then 3 pounds. I subtracted 84 from 99.7 (which is the whole distribution's percentage) and came up with 15.7.

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What are the domain and range of the function f(x) = 3^x + 5

Answers

Answer:

Hence,

Domain: (-∞,∞)

Range: (5,∞)

Step-by-step explanation:

The domain of the function is the possible set of values at which the function is defined.

and the range of the function is the corresponding function values at the points of the domain.

e are given a function f(x) as:

$f(x)=3^x+5$

Clearly the function $3^x$ is defined for all the real values.

Hence, the function:

$f(x)=3^x+5$ is defined for all the real numbers.

Hence the domain of the function is: (-∞,∞) i.e. all of the real line.

Also we know that:

$3^x>0$ for all x.

Hence,

$3^x+5>5$ for all x.

Hence, the range of the function is:

(5,∞).

Hence,

Domain: (-∞,∞)

Range: (5,∞)

The range is y values and domain is x values

y intercept here is 5 and since the function is increasing thus the range would be all real values bigger than or equal to 5

And the domain would be all real numbers.

What is the derivative of x cubed?

Answers

Answer:

$\displaystyle (dy)/(dx)[x^3] = 3x^2$

General Formulas and Concepts:

Calculus

Differentiation

Derivatives
Derivative Notation

Basic Power Rule:

f(x) = cxⁿ
f’(x) = c·nxⁿ⁻¹

Step-by-step explanation:

Step 1: Define

Identify

$\displaystyle y = x^3$

Step 2: Differentiate

Basic Power Rule: $\displaystyle y' = 3x^(3 - 1)$
Simplify: $\displaystyle y' = 3x^2$

Topic: AP Calculus AB/BC (Calculus I/I + II)

Unit: Differentiation

The inequality of 8z+3-2z<51 is

Answers

8z - 2z < 48
6z < 48
z < 8

In a deck of 52 cards, there are 13 different card values, and each card value appears in 4 suits. If you pull one card out of a deck of cards, what is the probability you will draw a 7?A.
1/4
B.
1/13
C.
7/52
D.
17/52

Answers

i believe B hopefully it helps

Suppose you place 16 green, 25 blue, and 9 yellow marbles in a non-transparent bag. you then randomize the marbles by shaking them up thoroughly. assume you then randomly select two marbles from the bag without replacement. what is the probability of selecting two blue marbles?

Answers

Answer: $(12)/(49)$

Step-by-step explanation:

16 green + 25 blue + 9 yellow = 50 Total

First pick: 25 blue out of 50 total = $(25)/(50) = (1)/(2)$

Second Pick: 24 blue out of 49 total = $(24)/(49)$

First Pick AND Second Pick

$(1)/(2)$ x $(24)/(49)$ = $(24)/((2)49)$ = $(12)/(49)$

Which function has an inverse that is a function? b(x) = x2 + 3
d(x) = –9
m(x) = –7x
p(x) = |x|

Answers

On the attached diagram you can see all graphs of functions b(x), d(x), m(x) and p(x).

Finding the inverse of a function f(x):

1. First, replace f(x) with y. This is done to make the rest of the process easier.

2. Replace every x with a y and replace every y with an x.

3. Solve the equation from Step 2 for y. This is the step where mistakes are most often made so be careful with this step.

4. Replace y with $f^(-1)(x).$ In other words, you’ve managed to find the inverse.

5. Remember: the domain of f is the range of $f^(-1)$ and the range of f is the domain of $f^(-1)$ .

Using this algorithm, you can find the inverse only in case C:

for m(x)=-7x:

1. y=-7x.

2. x=-7y.

3. y=-x/7.

4. $m^(-1)(x)=-(x)/(7)$ .

5. The domain and the range of m(x) are all real numbers as well as the domain and the range of $m^(-1)(x).$

Functions b(x) and p(x) are not one-to-one functions (see attached diagram), then you can't find an inverse function. Function d(x) doesn't include x, then you can't also find an inverse function.

Hello,

Answer C

y=-7x ==>x=-7y==>y=-x/7 is the inverse of m(x)
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