What is the end behavior of function h?

Answers

Answer 1

Answer:

As x approaches negative infinity, h(x) approaches positive infinity.

As x approaches positive infinity, h(x) approaches positive infinity

Step-by-step explanation:

Related Questions

58% of what number is 48?
your order comes in for new protective eye wear. you order five and a half dozen. how many individual protective eye wear should you have recieved
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PLSSS HELLLLLLP????The SAT this year has a mean of 500 and a standard deviation of 50. What percent of students scored between 400 and 600?
WILL GIVE BRAINLIESTHannah and Han are each trying to solve the equation x² – 8x + 26 = 0. They know thatx = -1 are i& - i, but they are not sure how to use this information to solve for x in theirequation.Part 1- Here is Hannah's work:x? - 8x + 26 = 0X? – 8x = -26Show Hannah howto finish her work using completing the square and complex numbers.Part 2- Han decides to solve the equation using the quadraticformula. Here is the beginning of hiswork-b+V62-4ac-(-8)+7-8)2–401|(26)Finish using the quadratic formula. Simplify the final answer as much as possible.

Given that D(x)=2 select all of the following that are true statements

Answers

If you're going to do a multiple choice question, please include the choices so we can better help you!

Write a recursive and explicit rule for each geometric sequence, and then find the next 3 terms.1.) 2, 8, 32

2.) 1004, 512, 256

Answers

Hello,

1)
$a_(0)=2$
$a_(1)=a_(0)*4=8$
$a_(2)=a_(1)*4=a_(0)*4^2=32$
$a_(3)=a_(2)*4=a_(0)*4^3=128$
$a_(4)=a_(3)*4=a_(0)*4^4=512$
$a_(5)=a_(4)*4=a_(0)*4^5=2048$
...
$a_(n+1)=a_(n)*4=a_(0)*4^(n+1)$

2)
$a_(0)=1024$
$a_(1)=a_(0)*0.5=512$
$a_(2)=a_(1)*0.5=a_(0)*0.5^(2)=256$
$a_(3)=a_(2)*0.5=a_(0)*0.5^(3)=128$
$a_(4)=a_(3)*0.5=a_(0)*0.5^(4)=64$
$a_(5)=a_(4)*0.5=a_(0)*0.5^(5)=32$
....
$a_(n+1)=a_(n)*0.5=a_(0)*0.5^(n+1)$

3 - 24 divided by 8 + 4 square

Answers

(3-24) / (8+4)^2
it's written like this right?

(-12) / (12)^2
do the work in the parenthesis first

(-12) / (144)
then square 12

(-1) / 12
simplify by dividing the numerator and the denominator by 12

What is the angle supplementary to the angle measuring 165°12′?A. 75°12′
B. 180′
C. 14°48′
D. 60′

Answers

Two angles are supplementary if their sum is 180 degrees. One degree is made up of 60 minutes. So the angle supplementary to an angle measuring 165d12m is 180d - 165d12m, which gives us 14d48m. So the answer is C.

Answer:

Option C is correct.

$14^(\circ)48'$ is the angle supplementary to the angle measuring $165^(\circ)12'$

Step-by-step explanation:

To find the angle supplementary to the angle measuring $165^(\circ)12'$

Let A be the angle supplementary to the angle measuring $165^(\circ)12'$ .

Supplementary Angles states that the two Angles are Supplementary when they add up to 180 degrees.

Use the conversion:

1 degree = 60 minute.

Then, we have the given angle $165^(\circ)12'$ = $165(12)/(60) =165(1)/(5) =165.2^(\circ)$

Now, by definition of supplementary angle;

$\angle A + 165.2^(\circ)= 180^(\circ)$

Subtract 165.2 on both sides we get;

$\angle A= 180^(\circ) - 165.2^(\circ) =14.8^(\circ) =14^(\circ)48'$

Therefore, the angle supplementary to the angle measuring $165^(\circ)12'$ is, $14^(\circ)48'$

Sandy has 16 roses, 8 daisies, and 32 tulips. She wants to arrange all the flowers in bouquets. Each bouquet has the same number of flowers and the same type of flower. What is the greatest number of flowers that could be in a bouquet?

Answers

Total trick question!! This can be answered multiple ways. First, one would think 7 because 16 roses, 8 daisies, and 32 tulips equal 56 total flowers and if divided equally into bouquets you would have 8 bouquets each with 2 roses, 1 daisy, and 4 tulips. That gives you the same type of flower in each bouquet along with the same amount of flowers in each bouquet. However, you can also have 8 of each type of flower in a bouquet. For example, 2 bouquets with 8 roses each, 1 bouquet with 8 daisies, and 4 bouquets with 8 tulips each.

Answer: For E2020 is B

P(tulip)= 37/86

Moso bamboo can grow 90 cm per day. a Lombardy poplar can grow up to 1 cm per day. A botanical garden has a 5.5 m tall Lombardy poplar and a 0.3 m tall Moso bamboo. If each plant grows at its maximum rate, which plant will be the tallest at the end of the week?

Answers

Srry just needed points

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