4’ square?* peterminter

Answers

Answer 1

Answer: If it is a square, all sides has equal length.
Since square has 4 sides one side has to be divided by 4.
4' * 4 = 16'

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Round 38.86 to one decimal place
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Evaluate 15÷3·(-2) + |-10|

Answers

The answer is 0. If you plug it into a calculator it takes only 5 seconds.

Create a quadratic polynomial function f(x) and a linear binomial in the form (x − a).Use complete sentences to explain how the remainder theorem is used to determine whether your linear binomial is a factor of your polynomial function

Answers

lets create both equations and :

f(x) = 5x^2 + 1

linear binomial form: x - 4

according to the remainder theorem, x - 4 is a divisor of f(x) if and only if f(4) = 0
f(4) = 5*16 + 1 = 81

hence x - 4 is not a divisor of f(x)

If f(x) = 3X + 10 and g(x) = 2x – 4, find (f- g)(x).

Answers

So (f-g)(x) is f(x)-g(x) so you have

(3x+10)-(2x-4)

Distribute the negative in to the 2x-4 to get

3x+10-2x+4

Then combing like terms you have

3x-2x+10+4

And then that gives you

x+14

So (f-g)(x)=x+14

Hope this helps!! Mark as brainliest!!!!

A triangle has two sides of lengths 7 and 9. What value could the length of the third side be?

Answers

x - length of the 3rd side

$7+9>x \wedge 7+x>9 \wedge 9+x>7\n x<16 \wedge x>2 \wedge x>-2\n x\in(2,16)$

Prove that: ${ \left( { e }^{ \sqrt { { e }^{ \ln { \left( \frac { { 3 }^( 0 ) }{ \sin { \left( \frac { \pi }{ 2 } \right) } } \right) } } } } \right) }^{ \ln { \left( \sqrt { { e }^{ \ln { \left( \frac { { 3 }^( 0 ) }{ \sin { \left( \frac { \pi }{ 2 } \right) } } \right) } } } \right) } }=1$

Show your workings.

Answers

${ \left( { e }^{ \sqrt { { e }^{ \ln { \left( \frac { { 3 }^( 0 ) }{ \sin { \left( \frac { \pi }{ 2 } \right) } } \right) } } } } \right) }^{ \ln { \left( \sqrt { { e }^{ \ln { \left( \frac { { 3 }^( 0 ) }{ \sin { \left( \frac { \pi }{ 2 } \right) } } \right) } } } \right) } }=1\n{ \left( { e }^{ \sqrt { { e }^{ \ln { \left( \frac { 1 }{ 1} \right) } } } } \right) }^{ \ln { \left( \sqrt { { e }^{ \ln { \left( \frac { 1 }{1 } \right) } } } \right) } }=1\n$
${ \left( { e }^{ \sqrt { { e }^( \ln 1 ) } } \right) }^{ \ln { \left( \sqrt { { e }^( \ln 1 ) } \right) } }=1\n{ \left( { e }^( \sqrt 1 ) \right) }^{ \ln { \left( \sqrt 1 \right) } }=1\n{ \left( { e }^ 1 \right) }^( \ln 1 )=1\n e ^( \ln 1 )=1\n1=1$

How many grams in a pound

Answers

There are 453.5 grams in 1 pound

I hope that's help and have a great night !

For one pound there would be 453.592. Hope this helps

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Compare the equation, y = 9x - 4x2, the graph below, and the table below. Which has the steepest rate of change from x = 1 to x = 2, and what is its value? x-1,1,2,3 y 0,2,0,-4A. graph, –1 B. table, -1/2 C. equation, –3 D. equation, -1/3

Order of operations question

If x,2x and 3x are the angles of a triangle find the size of angle