Multiplying Powers Unit 1.02 I can use the exponent rules to simplify exponential expressions.
Dec 30, 2015
Exponent PropertiesMultiplying Powers with the same base: To multiply
powers with the same base, add their exponents.
Example: Multiply the following powers.
A) B) C)
Exponent PropertiesRaising a Product to a Power: When raising a
product of numbers, or of numbers and variables to a power, the power must be applied to both parts of the product then simplified as necessary.
Example: Simplify each exponential expression.
A) B) C)
Exponent PropertiesRaising a Product to a Power: When raising a
product of numbers, or of numbers and variables to a power, the power must be applied to both parts of the product then simplified as necessary.
Example: Simplify each exponential expression.
A) B) C)
Exponent PropertiesRaising a Quotient to a Power: When raising a
quotient of numbers, or of numbers and variables to a power, the power must be applied to both parts of the quotient (numerator & denominator) then simplified as necessary.
Example: Simplify each exponential expression.
A) B) C)
Exponent PropertiesRaising a Quotient to a Power: When raising a
quotient of numbers, or of numbers and variables to a power, the power must be applied to both parts of the quotient (numerator & denominator) then simplified as necessary.
Example: Simplify each exponential expression.
A) B) C)