
Demonstrates how the quotient rule for exponents is applied the same way to rational exponents.


A multivariable fraction that is reduced by applying the quotient rule and the definition of a negative exponent.


A qucik example of applying the qoutient rule for exponents and the definition of a negative exponent.


A simplification of a fraction with products and exponents in parentheses raised to an external power


Two bases with exponents divided by the same bases with different exponents are presented and simplified using the quotient rule. The negative exponent definition is also discussed and applied.


A demo that approaches the given expression and its simplification by writing out the meaning of the exponents as muliplication, then reducing like factors to arrive at a simpler result


This demonstrates creating a multiplication in the numerator of a rational expression that will allow the expression to be reduced by dividing like factors to simply one


Shows how to manipulate fractional exponents in variou sways


Shows how to distribute a division like you do with multiplication when there is one term being distributed.


Using the quotient rule, we can eliminate the negeatiev exponent rigiht awa and then applly the "power rule".
