Holly wants to add an odd number to 659. Which number could possibly be the sum?

Answers

Answer 1

Answer: 1 is an odd number, therefore 660 (since 659+1=660) could possibly be the sum.

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Don gets $25 for whitewashing a fence. How many fences would he have to whitewash to earn a trip to camp that costs $165.00?

Answers

Answer:

7 fences would he have to whitewash to earn a trip to camp that costs $165.00

Step-by-step explanation:

Unit rate defined as the rates are expressed as a quantity as 1 such as 2 meter per seconds or 4 miles per hour.

As per the statement:

Don gets $25 for whitewashing a fence

⇒ $\text{Unit rate per fence} = \$ 25$

We have to find the fences would he have to whitewash to earn a trip to camp that costs $165.00.

$\text{Number of fences} = \frac{165}{\text{Unit rate per fence}}$

Substitute the given values we have;

$\text{Number of fences} = (165)/(25) = (33)/(5) = 6.6 \approx 7$

therefore, 7 fences would he have to whitewash to earn a trip to camp that costs $165.00

You would need to divide 165 by 25

25 50 75 100 125 150 175

He would need to whitewash seven fences. Even though 25*7 = 175, its better to have more money then not enough and realistically you cant whitewash a fraction of a fence.

In the first 42 Super Bowls, 0.16(repeating sign over 6) of the MVPs were running backs.a. What percent of the MVPs were running backs? Write the percent as a mixed number.

b. What fraction, in simplest form, of the MVPs were not running backs?

Answers

0.16 (repeating sing over 6) is a decimal number. It represents the running backs among the MVP.

1) It can be converted into its percentage form by multiplying it with 100%.

0.1666 x 100% = 16.66% of the MVP are running backs.

2) 1 - 0.1666 = 0.8334 is the decimal number for MVPs who were not running backs.

Its fraction form is 0.8334/1.000 or 83.34% of the MVPs were not running backs.

Hello there.

What percent of the MVPs were running backs?

16.66%

I'll give 100 pts and brainliest if you answer this!!!thank you for the help boo

Perform the operation. Write the answer in standard form.
1. (6 − i) + (9 + 5i)
2. (7 + 3i) + (11 + 2i)
3. (12 + 4i) − (2 − 15i)
4. (3 − 7i) − (3 + 5i)
5. 7 − (2 − 3i) + 6i
6. −16 + (3 + 4i) − 4i
7. 3i(6 − 5i)
8. −2i(8 + 2i)
9. (−5 + i)(8 − 6i)
10. (3 − 6i)(−1 + 7i)
11. (2 + 5i)(2 − 5i)
12. (−3 − i)(−3 + I)
13. (4 + i) 2
14. (5 − 9i) 2
Thank you again <3

Answers

Answer:

1. $4i+15$

2. $5i+18$

3. $-11i+10$

4. $-2i$

5. $9i+5$

6. $-13$

7. $-15i^(2)+18i$

8. $-4i^2-16i$

9. $-6i^2+38i-40$

10. $-42i^2+27i-3$

11. $-25i^2+4$

12. $-i^2+9$

13. $2i+8$

14. $-18i+10$

Step-by-step explanation:

Standard form means to put the terms in order based on their exponent (x³ -> x² -> x -> constant)

1. (6 - i) + (9 + 5i)

$4i+15$

2. (7 + 3i) + (11 + 2i)

$5i+18$

3. (12 + 4i) - (2 - 15i)

$-11i+10$

4. (3 - 7i) - (3 + 5i)

$-2i$

$35i^2+6i-9$

5. 7 - (2 - 3i) + 6i

$7 - 2 + 3i + 6i$

$9i+5$

6. -16 + (3 + 4i) - 4i

$-16 + 3 + 4i - 4i$

$-13$

7. 3i(6-5i)

$18i-15i^2$

$-15i^2+18i$

8. -2i(8+2i)

$-16i+-4i^2$

$-4i^2-16i$

9. (-5 + i)(8 - 6i)

$-40+30i+8i-6i^2$

$-6i^2+38i-40$

10. (3 - 6i)(-1 + 7i)

$-3+21i+6i-42i^2$

$42i^2+27i-3$

11. (2 + 5i)(2 - 5i)

$4-10i+10i-25i^(2)$

$-25i^2+4$

12. (-3 - i)(-3 + i)

$9 -3i + 3i -i^2$

$-i^2+9$

13. (4 + i) * 2

$2i+8$

14. (5 - 9i) * 2

$-18i+10$

:p when I first started answering this I thought the parentheses were being multiplied every time and did 100x more work .-.

Hope it helps <3 :D

Mike constructed a quadrilateral POQS. He used a compass and straightedge to accurately construct line segment OS, as shown in the figure below:An angle POQ is drawn. Two similar arcs intersect OP and OQ. Two more similar arcs intersect each other at a point S and a dashed line is drawn from O to S, such that OS bisects angle POQ

Which could be the measures of angle POS and angle POQ?

Answers

Unless we were given values of the angles, there is no way to find the numerical value of the angle. However, we can establish a relationship between the measures of angles POS and POQ. Since it was stated that OP and OQ were similar arcs (had the same value), and that OS bisects angle POQ, we can conclude that the two angles (POS and QOS) created from bisecting POQ are each, exactly half the angle POQ. Therefore:

angle POS = 1/2 angle POQ

Answer:

on the test the answer is m<POS= 25; m<POQ=50

Step-by-step explanation:

How many factors in the expression 8(x +4) (y +4) (z 2 + 4z + 7) have exactly two terms?

Answers

From the expression 8(x +4) (y +4) (z 2 + 4z + 7),
the factors are 8, (x+4), (y+4), (z^2 + 4z + 7) since each of these factors, when you divide that to the whole expression won't give a remainder.

Answer:

Only 2 factors have exactly two terms i.e, (x+4)(y+4)

Step-by-step explanation:

Given : Expression $8(x+4)(y+4)(z^2+4z+7)$

To find : How many factors in the expression have exactly two terms?

Solution :

Expression $8(x+4)(y+4)(z^2+4z+7)$ cannot be further factorized.

Now, We count the terms in each factor.

1) Factor- 8

Only 1 term i.e, 8 itself.

2) Factor- x+4

Two terms .i.e., x and 4

3) Factor- y+4

Two terms .i.e., y and 4

4) Factor- $z^2+4z+7$

Three terms .i.e., $z^2$ , 4z and 7.

Therefore, Only 2 factors have exactly two terms i.e, (x+4)(y+4).

Find all relative extrema of the function. use the second derivative test where applicable. (if an answer does not exist, enter dne.) f(x) = x3 − 9x2 + 2

Answers

First find the derivative of the function. The derivative is $f'(x)=3 x^(2) -18x$ . Now set it equal to 0 to find the critical numbers. $0=3 x^(2) -18x$ . Factor to solve for the zeros of the derivative. $0=3x(x-6)$ . So 3x = 0, and x = 0, or x - 6 = 0 and x = 6. We will make a table with values for -∞<x<0, 0<x<6, 6<x<∞. Pick a value within those boundaries for each interval and find the sign, positive or negative, that results from subbing that number into the derivative. If we choose -1 in the first interval f'(-1)=21, so the function is increasing from negative infinity to 0. If we choose 1 in the second interval, f'(1)=-15, so the function is decreasing from 0 to 6. If we choose 10 in the last interval, f'(10)=120, so the function is increasing from 6 to infinity. The points of extrema are found by subbing the critical x values into the original function. We know the function is increasing from negative infinity to 0, so f(0)=2, and our max point is (0, 2). We know the function is decreasing from 6 to infinity, so f(6)=-106, and our min point is (6, -106). I do this instead of the second derivative test, but they both work.

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