QUESTION IMAGE
Question
1/21 and 1/22
name kayleigh hadathlie
simplify. your answer should contain only positive exponents.
- $(m^{3})^{-4}$
- $(p^{10})^{-8}$
- $(b^{-2})^{7}$
- $(xy^{-10})^{6}$
- $(x^{-1}y^{9})^{10}$
- $(a^{-7})^{-4}$
- $(x^{-5}y^{9})^{-3}$
- $(2x^{9}y^{-8})^{8}$
- $(2v^{-9})^{10}$
Step1: Apply power of a power rule
For $(m^3)^{-4}$: $(a^m)^n=a^{m \cdot n}$, so $m^{3 \cdot (-4)}=m^{-12}$. Convert to positive exponent: $a^{-n}=\frac{1}{a^n}$, so $\frac{1}{m^{12}}$.
Step2: Apply power of a power rule
For $(p^{10})^{-8}$: $p^{10 \cdot (-8)}=p^{-80}$. Convert to positive exponent: $\frac{1}{p^{80}}$.
Step3: Apply power of a power rule
For $(b^{-2})^7$: $b^{-2 \cdot 7}=b^{-14}$. Convert to positive exponent: $\frac{1}{b^{14}}$.
Step4: Apply product & power rules
For $(xy^{-10})^6$: $(ab)^n=a^n b^n$, so $x^6 \cdot (y^{-10})^6$. Then $(y^{-10})^6=y^{-60}$. Convert to positive exponent: $\frac{x^6}{y^{60}}$.
Step5: Apply product & power rules
For $(x^{-1}y^9)^{10}$: $(x^{-1})^{10} \cdot (y^9)^{10}=x^{-10}y^{90}$. Convert to positive exponent: $\frac{y^{90}}{x^{10}}$.
Step6: Apply power of a power rule
For $(a^{-7})^{-4}$: $a^{-7 \cdot (-4)}=a^{28}$.
Step7: Apply product & power rules
For $(x^{-5}y^9)^{-3}$: $(x^{-5})^{-3} \cdot (y^9)^{-3}=x^{15}y^{-27}$. Convert to positive exponent: $\frac{x^{15}}{y^{27}}$.
Step8: Apply product & power rules
For $(2x^9y^{-8})^8$: $2^8 \cdot (x^9)^8 \cdot (y^{-8})^8=256x^{72}y^{-64}$. Convert to positive exponent: $\frac{256x^{72}}{y^{64}}$.
Step9: Apply product & power rules
For $(2v^{-9})^{10}$: $2^{10} \cdot (v^{-9})^{10}=1024v^{-90}$. Convert to positive exponent: $\frac{1024}{v^{90}}$.
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- $\frac{1}{m^{12}}$
- $\frac{1}{p^{80}}$
- $\frac{1}{b^{14}}$
- $\frac{x^6}{y^{60}}$
- $\frac{y^{90}}{x^{10}}$
- $a^{28}$
- $\frac{x^{15}}{y^{27}}$
- $\frac{256x^{72}}{y^{64}}$
- $\frac{1024}{v^{90}}$