Module 12 Word Scramble
|
Embed Code - If you would like this activity on your web page, copy the script below and paste it into your web page.
Normal Size Small Size show me how
Normal Size Small Size show me how
Question | Answer |
Write the expression in radical form 6^(3/2) | The denominator of 2 becomes the index. The numerator of 3 becomes the power which it is raised by. (√6)^3 Square root of 6 to the third power. |
Write the expression in radical form 7^(4/3) | The denominator of 3 becomes the index. The numerator of 4 becomes the power by which its raised. (3√7)^4 Cube root of 7 raised to the 4th power |
Write the expression in exponential form (√10)^3 Square root of 10 cubed | The understood index of 2 becomes the denominator. The numerator is 3 because the that is the power its raised to. 10^(3/2) |
Write the expression in exponential form (3√6x)^4 Cube root of 6x raised to the fourth power | The index of 3 becomes the denominator. The numerator is 4 because the that is the power its raised to. (6x)^(4/3) |
What is the Power Rule? | The Power Rule: (a^m)^n = a^mn |
What is the Product Rule? | The Product Rule: (a^m)*(a^n) = a^m+n |
What is the Quotient Rule? | The Quotient Rule: (a^m)/(a^n) = a^m-n |
Simplify (-64)^(2/3) | Rewrite as cubed root of negative 64 squared. (3√-64)^2. Cube root the negative 64 leaving -4. (-4)^2. Then square the -4, giving the answer of 16. |
Simplify (4√16x^2) Fourth root of 16x squared | Fourth root the 16 and pull out the 2. 2(4√x^2). Divide out the fourth root of x. 2x^(2/4). Simplify the 2/4 to 1/2. 2x^1/2. x^(1/2) is the square root of x. 2√x is the answer. |
Simplify 6√x^3 Sixth root of x cubed | Divide out the index into the x cubed. x^(3/6). Simplify. x^(1/2). x^(1/2) = √x. The answer is √x. |
Created by:
Wicah1
Popular Math sets