Question

Describe the laws of integral powers with suitable examples​

Answer 1

Answer:

Step-by-step explanation:Note 1: "Integral exponent" means the exponent is a whole number [That is, an integer] Note 2: The above definition only really holds if m is a positive integer, since it doesn't make a lot of sense if m is negative. (You can't multiply something by itself negative 3 times!

For example, 7 × 7 × 7 can be represented as 73. Here, the exponent is '3' which stands for the number of times the number 7 is multiplied. ... So basically exponents or powers denotes the number of times a number can be multiplied. If the power is 2, that means the base number is multiplied two times with itself.

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Note 1: "Integral exponent" means the exponent is a whole number [That is, an integer] Note 2: The above definition only really holds if m is a positive integer, since it doesn't make a lot of sense if m is negative. (You can't multiply something by itself negative 3 times!

Answer 2

Answer:

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Note 1: "Integral exponent" means the exponent is a whole number [That is, an integer] Note 2: The above definition only really holds if m is a positive integer, since it doesn't make a lot of sense if m is negative. (You can't multiply something by itself negative 3 times!

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