Question

using the laws of exponents simplify​

Answer 1

Answer:

$(7 {}^{2} ) {}^{3} \div 7 {}^{3} \\ = \frac{(7 {}^{2} ) {}^{3} }{7 {}^{3} } \\ = \frac{7 {}^{2 \times 3} }{7 {}^{3} } = \frac{7 {}^{6} }{7 {}^{3} } \\ = 7 {}^{6} \times 7 {}^{ - 3} = 7 {}^{6 - 3} \\ = 7 {}^{3} = 7 \times 7 \times 7 = 343 \: \: ans$

Hey! Mate Here is your solution. Thanks

Answer 2

Answer:

${7}^{3} \: \: or \: \: \: 343$

Step-by-step explanation:

${ \small \purple {\textsf{first \: law \: to \: be \: used - }}}$

$( {a}^{m} ) {}^{n} = a {}^{m \times n}$

so the first integer would be =

${(7}^{2} ) {}^{3} \\ = 7 {}^{2 \times 3} \\ = {7}^{6}$

and the second integer would be =

${7}^{3}$

${ \small \orange{ \textsf{second \: law \: to \: be \: used - }}}$

${a}^{m} \div {a}^{n} = {a}^{m - n}$

so the next step would become:

${7}^{6} \div {7}^{3} \\ = {7}^{6 - 3} \\ = {7}^{3}$

the answer is :

${7}^{3} \: or \: 343$

# mark it as the BRAINLIEST

# thank toh kardo

@ Lalitya