Answer:
Question One: log_2(x - 6) = y
Question Two: First blank: 4 Second blank 0
Question Three: B
Step-by-step explanation:
f(x) = 2^x + 6
y = 2^x + 6 Interchange the x and y
x = 2^y + 6 Subtract 6 from both sides
x - 6 = 2^y Take the log of both sides
log(x - 6) = log 2^y The power can be multiplied by the log of 2
log(x - 6) = y log(2) Divide by the log of 2
log(x - 6)/log(2) = y This to me is the preferred answer. It allows you to calculate what the actual number is or graph it on Desmos
The answer I have given is equivalent to using base 2 as your log, but calculating that is not always easy.
log_2(x - 6) = y
Answer: D
Problem Two
You want the inverse of y = - 1/2 sqrt(x + 3) x ≥ - 3
Note: you cannot have any number less than -3 because if you do, you will be taking the square root of -x which involves complex numbers. In addition x ≥ -3 is a domain. You have to keep that in mind when doing this question.
- y = - 1/2 sqrt(x + 3) Interchange the x and y
- x = - 1/2 sqrt(y + 3) Multiply by - 2
- -2x = sqrt(y + 3) Square both sides
- (-2x)^2 = sqrt(y + 3)^2
- 4x^2 = y + 3 Subtract 3 from both sides
- y = 4x^2 - 3
The domain and range of this is a little harder to figure out. The range of f(x) becomes the domain of f-1(x)
The range of f(x) is 0 <=y < - infinity
So the domain of f-1(x) <= 0
Answer: The first blank is 4 and the second one is 0
Graph: the graph is given you below the question. What it shows is the f(x) and f^-1(x) are symmetrical about y = x. Most inverses are. If you want to check your work, it is best to include a graph when doing inverses.
- Red Original
- Blue inverse
- Black: y = x
Problem Three
The best way to begin this problem is to apply the associative property of multiplication and start by rewriting the givens as x^(1/2)[(x - 6)(x + 3)]. Do what is in the square brackets first.
- x^(1/2) [x^2 - 6x + 3x - 18]
- x^(1/2) [x^2 - 3x - 18]
Now deal with the x^(1/2) which must be multiplied by all three terms in the square brackets.
- x^(1/2)*x^2: x^(2 + 1/2) = x^(4/2 + 1/2) = x^(5/2)
- x^(1/2)*(-3x): - 3 x^(2/2 + 1/2) = - 3x^(3/2)
- x^(1/2)*(-18): - 18x^(1/2)
Result: x^(5/2) - 3x^(3/2) - 18x^(1/2)
Answer: √(x^5) - 3√x^3 - 18√x
Answer: B
