, so 

. 

From the diagram below, we see that .

The correct response is that .

or

This can be solved by graphing  and  on the same set of axes and noting their points of intersection:

The graphs of the two functions intersect at the point . Therefore, 

, and 

.

The correct response is .

An -intercept of the graph of  has as its -coordinate a value such that

,

or, equivalently,

From the diagram, we can see that

Therefore, to find the -intercepts of , set  equal to these numbers; equivalently, subtract 5 from each number. We get that

Therefore, the -intercepts of the graph of  are the points

, , .

The correct choice is .

The -intercept of a function is the point at which , so we can find this by evaluating .

As can be seen in the diagram below, .

Therefore, , and the correct response is .

This problem can be solved by examining the behavior of the graph of , which is a parabola.

Since the quadratic coefficient is 1, a positive number, its vertex is a minumum. The -coordinate of the vertex can be found by setting , and calculating:

The -coordinate is

The minimum value of  is therefore 1, and this occurs at . This makes 1 the lower bound of the range.

Since the graph of  is a parabola, it decreases everywhere for  and increases everywhere for . Therefore, we can evaluate  and , and choose the higher value as the maximum value on the given domain.

We choose 26 as the upper bound of the range.

Therefore, the range of , given the domain restriction, is the set .

The first step is to cross multiple which leaves you with .  The next step is to get all  on one side of the equation and all constants on the other.  You can add  to both sides then subtract  from both sides.  This gives us .  The last step is to get  by itself by dividing each side by  giving an answer of 

Since the final answer is  with the absolute value, then  can be  or . To get , you have to plug in  for  . To get , you plug in  .

To simplify this equation, first subtract  on both sides of the equation.

Multiply  on both sides of the equation to eliminate the denominator on the left side of the equation.

Divide by  on both sides of the equation to isolate .

The negative sign can be extracted out in front of the fraction.

The negative sign can then be distributed with the denominator.

The correct answer is:  

It is important to follow the order of operations for this equation and find a solution that satisfies both F(x) and G(x).

Recall the order of operations is PEMDAS: Parentheses, Exponents, Multiplication/Division, Addition/Subtraction.

The correct answer is 4 because 

F(x) = 2x + 3^x + (9x/3) = 2(4) + 3⁴ + ((9 * 4)/3) = 101, and

G(x) = (((2⁴ + 4⁴)/2) - 4 * 4) – 5(4) + 1 = 101.  

If the expression between the absolute value bars is nonnegative, then , and 

This happens if:

If the expression between the absolute value bars is negative, then , and 

This happens if:

, or 

Therefore, the function  can be restated as 

.