Definitions
Simplifying with Variable and Numerical Bases
Simplifying with Numerical Bases
All Rules Apply
Radicals
Final Jeopardy
100
If a quotient of powers has the same base you _____________ the exponents.
What is subtract?
100
2r^2*3r^-1
What is
6r
100
2^3*2^2
What is
32
100
8/(x^-3)
What is
8x^3
100
9^(1/2)
What is
3
100
(4xy^4)/(x^5y^-1)
(4y^5)/(x^4)
200
If a product of powers has the same base you ____________ the exponents.
What is add?
200
2a*ab^-2
What is
(2a^2)/b^2
200
3^8*3^2*3^-6
What is
81
200
((5x)/(y^3))^0
What is
1
200
49^(1/2)
What is
7
300
If you have a power raised to another exponent you ___________ the exponents.
What is multiply?
300
(a*4a^2)^3
What is
64a^9
300
(2^2*2^-3)^2
What is
1/4
300
-2^-4
What is
-(1)/16
300
b^(2/1)
What is
b^2
400
1 divided by a power with a positive exponent is the same as writing the power with a ___________________.
What is a negative exponent?
400
(18x^4)/(3x^2)
What is
6x^2
400
(4^6 )/(4^4)
What is
16
400
f^3/f^7
What is
1/f^4
400
8^(2/3)
What is
4
500
When simplifying cubed roots, you need to find _____ of the same number that multiplies to make the value under the radical.
What is
3
500
(x^0x^4)/((x^-4)^2)
What is
x^12
500
(2^2*2^-2) /2
What is
1/2
500
(3c)^-3
What is
1/(27c^3)
500
81^(3/4)
What is
27