PSAT Math : How to find f(x)
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Example Question #37 : How To Find F(X)
If
I.
II.
III.
I, II and III
II and III only
II only
I and III only
I only
II and III only
Choice I is incorrect because to equal 0, 
Choice II is correct because 
Choice III is correct because 
Example Question #38 : How To Find F(X)
Jamie is three times her little brother's age, and her little brother is two years younger than his older brother. Collectively, the three of them are 27 years old. How old is Jamie?
None of the available answers
The algebraic expression for 
Jamie's youngest brother is five, the next oldest brother is seven, and Jamie is 15.
Example Question #962 : Psat Mathematics
Consider the function defined as follows:
Find:
The notation used above can be confusing. Let:
We can now find the answer by substituting the appropriate values into the equation:
Therefore:
Finally:
Example Question #41 : How To Find F(X)
Solve for 
To solve for 
The answer of 
Example Question #1 : How To Find F(X)
If f(x)=3x and g(x)=2x+2, what is the value of f(g(x)) when x=3?
18
20
22
24
24
With composition of functions (as with the order of operations) we perform what is inside of the parentheses first. So, g(3)=2(3)+2=8 and then f(8)=24.
Example Question #1 : How To Find F(X)
g(x) = 4x – 3
h(x) = .25πx + 5
If f(x)=g(h(x)). What is f(1)?
42
19π – 3
4
π + 17
13π + 3
π + 17
First, input the function of h into g. So f(x) = 4(.25πx + 5) – 3, then simplify this expression f(x) = πx + 20 – 3 (leave in terms of π since our answers are in terms of π). Then plug in 1 for x to get π + 17.
Example Question #2791 : Sat Mathematics
If 7y = 4x - 12, then x =
Adding 12 to both sides and dividing by 4 yields (7y+12)/4.
Example Question #2 : How To Find F(X)
What is 
Example Question #2791 : Sat Mathematics
If F(x) = 2x2 + 3 and G(x) = x – 3, what is F(G(x))?
2x2
2x2 + 12x +18
6x2 + 5x
2x2 – 12x +21
6x2 – 12x
2x2 – 12x +21
A composite function substitutes one function into another function and then simplifies the resulting expression. F(G(x)) means the G(x) gets put into F(x).
F(G(x)) = 2(x – 3)2 + 3 = 2(x2 – 6x +9) + 3 = 2x2 – 12x + 18 + 3 = 2x2 – 12x + 21
G(F(x)) = (2x2 +3) – 3 = 2x2
Example Question #4 : Algebraic Functions
If a(x) = 2x3 + x, and b(x) = –2x, what is a(b(2))?
–132
–503
503
132
128
–132
When functions are set up within other functions like in this problem, the function closest to the given variable is performed first. The value obtained from this function is then plugged in as the variable in the outside function. Since b(x) = –2x, and x = 2, the value we obtain from b(x) is –4. We then plug this value in for x in the a(x) function. So a(x) then becomes 2(–43) + (–4), which equals –132.
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