Algebra 2 Unit 3 Review

Exponent Properties

nth roots and rational exponents

Transformations

Solving Radical Equations

true or false

100

3⁰+4⁰

100

(-216)^1/3

-6

100

Let the graph of g be a vertical shrink by a factor of 2. f(x)=sqrt(x)

2sqrt(x)

100

2sqrt(x)=4

x=4

100

I can multiply exponent when they have the same base

false

200

(x³)(y¹⁰)(x⁵)(y⁶)

x⁸y¹⁶

200

8^5/3

200

Let g be a reflection in the x-axis, followed by a translation 7 units right of the graph of f(x)=sqrt(x) Write a rule for g.

-sqrt(x-7)

200

cuberoot(2x-9)=2

x=17/2

200

when you raise a variable to the 1/2 it is the same as finding its square root

true

300

(6x^-7y²x⁵)³

216x^-6y⁶

300

(49)^-3/2

1/343

300

Let g be a reflection in the x-axis, followed by a translation 5 units right, 4 up of the graph of f(x)=sqrt(x) Write a rule for g.

g(x)=sqrt(x-5)+4

300

3sqrt(49)+x=10

x=-11

300

Thr product porperty for radicals states you can multiply whats inside the radicand if you have the same index

true

400

(2x⁵y⁶x^-3y^-3)²*(2x²)

8x⁶y⁶

400

(16)^1/3-5(2)^1/3

-3(2^1/3)

400

Let g be a reflection in the y-axis, no vertical stretch followed by a translation 3 units right, 2 up of the graph of f(x)=sqrt(x) Write a rule for g.

g(x)=sqrt(-x-3)+2

400

2cuberoot(x-2)=6

x=29

400

If you multiply two numbers and both are raised to the same exponent, I can add the numbers

false, you multiply them

500

(5^1/2*5^-3/2)^-1/4

5^1/4

500

(144a²b²c⁴)^1/2

12abc²

500

Let g be a reflection in the x-axis, followed by a translation 7 units right and vertical stretch by a factor of 4 of the graph of f(x)=sqrt(x) Write a rule for g.

-4sqrt(x-7)

500

4sqrt(x+8)=10

x=-412/64 or x= -103/16

500

If you have a horizontal stretch/shrink shift, you apply the factor as is, but with a vertical stretch/shrink you flip the factor.

false