Simplifying Exponents
Scientific Notation
Simplifying Radical Expressions
Operations with Radical Expressions
Miscellaneous
100
(-5/6)^0
1
100
What does scientific notation look like? Be specific.
a number between 1 and 10 times 10 to a power
100
root 2 1960
14 root 2 10
100
4 root 2 5 - 5 root 2 7 + 2 root 2 7 - 4 root 2 5
-3 root 2 7
100
Write in radical form.
27^(1/3)
root 3 27
200
(48x^3y^5)/(6xy^2)
8x^2y^3
200
Write 2,356 in scientific notation.
2.356*10^3
200
root 3 432
6 root 2 2
200
3 root 2 5 * 15 root 2 5
45 root 2 5
200
Solve.
2^(2x)=16^(2x-1)
2/3
300
(3x^2y^-5)^3
27x^6y^-15
300
Write 1,990,000,000,000,000,000 in scientific notation.
1.99 * 10^18
300
root 2 (169x^2y^4
13xy^2
300
12 root 2 45 *2 root 2 10
360 root 2 2
300
Rewrite in radical form AND evaluate
27^(4/3)
root 3 (27)^4
81
400
((2t^5u^3)/(4t^4))^3
(t^3u^9)/8
400
3*10^2 + 5*10^2
8*10^2
400
root 3 (144/250
(2 root 3 3)/5
400
root 2 50 + 2 root 2 450 - root 2 49
35 root 2 2 + 7
400
Solve.
4=16^(x-2)
5/2
500
(5a^-5b^4)/(15a^2b^-6)
b^10/(3a^7)
500
(2 * 10^3)(4*10^6)
8 *10^9
500
root 3 (54x^4y^6z^8)
3xy^2z^2 root 3 (2xz^2)
500
5root 2 3(2root2 6 + root 2 3)
30 root 2 2 +15
500
(-3,1)