1.

Choose the correct descending order for the following:\[{{4}^{5+6}},{{({{4}^{5}})}^{6}},{{4}^{8}}\times {{4}^{4}},\frac{{{4}^{6}}}{{{4}^{-7}}},{{4}^{10}}\times {{4}^{0}}\]. 

A. \[{{\left( {{4}^{5}} \right)}^{6}}>\text{ }{{4}^{8}}\times {{4}^{4}}>\frac{{{4}^{6}}}{{{4}^{-7}}}>{{4}^{5+6}}>{{4}^{10}}\times {{4}^{0}}\]
B. \[{{({{4}^{5}})}^{6}}>\frac{{{4}^{6}}}{{{4}^{-7}}}>{{4}^{8}}\times {{4}^{4}}>{{4}^{5+6}}>{{4}^{10}}\times {{4}^{0}}\]
C.  \[{{4}^{8}}\times \,{{4}^{4}}>{{({{4}^{5}})}^{6}}>\frac{{{4}^{6}}}{{{4}^{-7}}}>\text{ }{{4}^{10}}\times {{4}^{0}}>{{4}^{5+6}}\]
D. \[{{4}^{8}}\times {{4}^{4}}<{{({{4}^{5}})}^{6}}<\frac{{{4}^{6}}}{{{4}^{-7}}}<{{4}^{10}}\times {{4}^{0}}<{{4}^{5+6}}\]
E. None of these
Answer» C.  \[{{4}^{8}}\times \,{{4}^{4}}>{{({{4}^{5}})}^{6}}>\frac{{{4}^{6}}}{{{4}^{-7}}}>\text{ }{{4}^{10}}\times {{4}^{0}}>{{4}^{5+6}}\]


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