The completed table of the functions and inverses can be presented as follows;
1. t(x) → a(x)
2. Q(x) → B(x)
3. G(x) → c(x)
4. f(x) → D(x)
5. y(x) → w(x)
6. e(x) → R(x)
7. U(x) → H(x)
8. P(x) → J(x)
9. m(x) → k(x)
10. S(x) → n(x)
Which method can be used to complete the table?
Making x the subject of the given functions to find the inverse gives;
1. a(x) = 2•(x - 6)
Therefore;
x = (a(x)/2) + 6
t(x) = (x/2) + 6
Therefore;
2. G(x) = (1/4)•x²
4•G(x) = x²
x = 2•√(G(x))
3. B(x) = √(x)/4
4•B(x) = √(x)
x = 16•(B(x))²
Q(x) = 16•x²
Therefore;
4. D(x) = (x + 6)/2
x = 2•D(x) - 6
f(x) = 2•x - 6
Therefore;
5. y(x) = (4•x + 2)²
(√(y(x)) - 2)/4 = 4•x
w(x) = (√(x) - 2)/4
Therefore;
6. R(x) = (1/4)•(4•x)²
x = √(4•R(x))/4 = √(R(x))/2
e(x) = √(x)/2
Therefore;
7. H(x) = 2•x + 6
(H(x) - 6)/2 = H(x)/2 - 3
x = H(x)/2 - 3
U(x) = x/2 - 3
Therefore;
8. J(x) = (√(x + 2))/4
x = (4•J(x))² - 2
P(x) = (4•x)² - 2
Therefore;
9. k(x) = x/4 + 3
x = 4•(k(x) - 3) = 4•k(x) - 12
m(x) = 4•x - 12
Therefore;
10. n(x) = 4•(x + 3)
x = n(x)/4 - 3
S(x) = x/4 - 3
Therefore;
Learn more about making a variable the subject of a formula here:
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