What is the cost of 1 pound of potatoes? Enter the answer in the box.

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Answer 1

Answer: about $2.25 for 1 pound of potatoes

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Eloise needs to rent a car. She goes to the rental agency and finds out that she will have to pay a fee of $35 and then an additional $0.10 for every mile that she drives. How much will she have to pay if she drives 20 miles?A) $2 B) $33 C) $37 D) $55 E) $70
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How many different arrangements can be made with the letters in the word POWER?100
20
120
25

Answers

120 different arrangements

Answer:120

Step-by-step explanation:

While visiting in New York City, Monica rode in an Uber. The Uber driver charged her a fixed fee of $8 plus $4 for each mile she rode. Which equation could Monica have used to calculate the total cost in dollars as a function of the distance traveled, in miles, m? In addition, what is the range of the function for a maximum 5 mile taxi ride? f of m = 8(m) plus 4, Range: , 0, symbol, f of m, symbol, 28 f of m = 4(m), Range: , 0, symbol, f of m, symbol, 28 f of m = 4(m) plus 8 Range: , 8, symbol, f of m, symbol, 28 f of m = 4(m) plus 12, Range: , 0, symbol, f of m, symbol, 5

Answers

Step-by-step explanation:

The options are not to clear, nevertheless let us model the expression for the cost.

Let y be the total cost

And x be the number of miles

Given that the fixed rate is $8 and $4 for each extra mile traveled

The total cost is

y=8+4x

For a 5 mile journey the cost is

y=8+4(5)

y=8+20

y=28

$28

Let f(x)= x^4 + ax^2 +b. The graph of f has a relative minimum at (0,1) and an inflection point when x=1. The values of a and b are...I AM EXTREMELY DESPERATE I NEED THIS ANSWER!!!

Answers

$f(x)=x^4+ax^2+b\nf'(x)=4x^3+2ax\nf''(x)=12x^2+2a\nf''(1)=12(1)^2+2a\n12(1)=-2a\na=-6\n\nf(x)=x^4-6x^2+b\n(1)=(0)^4-6(0)^2+b\nb=1$

a=-6
b=1

Simplify completely the quantity x squared plus x minus 12 over quantity x squared minus x minus 20 divided by the quantity 3 x squared minus 24 x plus 45 over quantity 12 x squared minus 48 x minus 60.

Answers

x² + x - 12 / x² - x - 20 ÷ 3x² - 24x + 45 / 12x² - 48x - 60

x² + x - 12 / x² - x - 20 * 12x² - 48x - 60 / 3x² - 24x + 45

(x² + x - 12)(12x² - 48x - 60)
(x² - x - 20)(3x² - 24x + 45)

12x^4 - 48x³ - 60x² + 12x³ - 48x² - 60x - 144x² + 576x + 720
3x^4 - 24x³ + 45x² - 3x³ + 24x² - 45x - 60x² + 480x - 900

12x^4 - 48x³ + 12x³ - 60x² - 48x² - 144x² - 60x + 576x + 720
3x^4 - 24x³ - 3x³ + 45x² + 24x² - 60x² - 45x + 480x - 900

12x^4 - 36x³ - 252x² + 516x + 720
3x^4 - 27x³ + 9x² + 435x - 900

12(x^4 - 3x³ - 21x² + 43x + 60)
3(x^4 - 9x³ + 3x² + 145x + 300)

4(x^4 - 3x³ - 21x² + 43x + 60)
(x^4 - 9x³ + 3x² + 145x + 300)

Evaluate the following expression, if possible. 36^((3)/(2))

Answers

Answer:

216

Step-by-step explanation:

The expression in the form $a^(b)/(c)$ can be rewritten as $\sqrt[b]{a^c}$ . Given this, the steps to evaluate the expression are as follows:

Rewrite the expression in the form $\sqrt[b]{a^c}$ :
$36^(3)/(2) =\sqrt[2]{36^3}=√(36^3)$
Evaluate $√(36^3)$ :
$√(36^3) =√(36^2*36)\n =36√(36)\n =36*6\n=216$ The final solution is 216.

A relation is plotted as a linear function on the coordinate plane starting at point e (0, 27)(0, 27) and ending at point f (5,−8)(5,−8) .what is the rate of change for the linear function and what is its initial value?select from the drop-down menus to correctly complete the statements.the rate of change for the linear function is

Answers

The slope of the line is calculated using
y2 - y1 / x2 - x1
Substituting the given values
-8 - 27 / 5 - 0 = -7
The rate of change or the slope is -7
And the initial value is the value of y when x is 0. From the first coordinates, the initial value is 27.

Hello there.

A relation is plotted as a linear function on the coordinate plane starting at point e (0, 27)(0, 27) and ending at point f (5,−8)(5,−8) .what is the rate of change for the linear function and what is its initial value?

27

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