In general, this describes the power rule for exponents(xm)n=xmn ( x m ) n = x m n ; a power raised to a power can be simplified by multiplying the exponents.. Given positive integers m and n, then. In other words, when raising a power to a power, multiply the exponents.
Answer: In general, this describes the power rule for exponents(xm)n=xmn ( x m ) n = x m n ; a power raised to a power can be simplified by multiplying the exponents.. Given positive integers m and n, then. In other words, when raising a power to a power, multiply the exponents.
Answers & Comments
Answer:
In general, this describes the power rule for exponents(xm)n=xmn ( x m ) n = x m n ; a power raised to a power can be simplified by multiplying the exponents.. Given positive integers m and n, then. In other words, when raising a power to a power, multiply the exponents.
Step-by-step explanation:
Power rule: (xm)n=xm⋅n(xm)n=xm⋅n
Product rule: xm⋅xn=xm+nxm⋅xn=xm+n
Quotient rule: xmxn=xm−n,x≠0xmxn=xm−n, x≠0
Answer: In general, this describes the power rule for exponents(xm)n=xmn ( x m ) n = x m n ; a power raised to a power can be simplified by multiplying the exponents.. Given positive integers m and n, then. In other words, when raising a power to a power, multiply the exponents.
Power rule: (xm)n=xm⋅n(xm)n=xm⋅n
Product rule: xm⋅xn=xm+nxm⋅xn=xm+n
Quotient rule: xmxn=xm−n,x≠0xmxn=xm−n, x
Step-by-step explanation: