You have two exponential functions. One function has the formula g(x) = 5 ^x . The other function has the formula h(x) = 5^-x . Which option below gives formula for k(x) = (g - h)(x)?

we are given with two functions here: h(x) is 5^-x and g(x) is 5^x . we are asked in the problem to determine the value of the expression (g-h)(x). In this case, we just have to employ subtraction to the given functions. That is

(g-h)(x) = 5^x - 5^-x
= 5^x -1/5^x
= (5^2x -1)/5^x

Answer Link

tardymanchester tardymanchester · Answer 2 · 2019-05-14T06:26:27+02:00

Answer:

The required result is [tex]k(x)=\frac{5^{2x}-1}{5^x}[/tex]

Step-by-step explanation:

Given : You have two exponential functions. One function has the formula [tex]g(x) = 5 ^x[/tex] . The other function has the formula [tex]h(x) = 5^{-x}[/tex] .

To find : Which gives formula for [tex]k(x)=(g-h)(x)[/tex]?

Solution :

Let [tex]g(x) = 5 ^x[/tex] ....(1)

[tex]h(x) = 5^{-x}[/tex] .....(2)

We have to find, [tex]k(x)=(g-h)(x)[/tex]

We can write it as,

[tex]k(x)=g(x)-h(x)[/tex] ......(3)

Now, substitute the values from (1) and (2) in equation (3),

[tex]k(x)=5^x-(5^{-x})[/tex]

Open the parenthesis on right hand side of equation, we get

[tex]k(x)=5^x-5^{-x}[/tex]

Now, Using [tex]x^{-a}=\frac{1}{x^a}[/tex]

[tex]k(x)=5^x-\frac{1}{5^x}[/tex]

Taking LCM,

[tex]k(x)=\frac{5^{2x}-1}{5^x}[/tex]

Therefore, The required result is [tex]k(x)=\frac{5^{2x}-1}{5^x}[/tex]