the exponent form of ³√7
Answers
Answer:
(71/3)
I think it's help you
Given: ³√7
To find The exponent form of ³√7
Solution: A number that is multiplied by itself to the number of times of that number is said to be an exponent. In mathematics, an exponent can be defined as a letter or a number that is written on the above right side of the given mathematical expression. To indicate this exponent, we have to consider a mathematical expression comprising two parts, say 'y' is the base of that expression and is a number that is positive and 'a' is the power or exponent. Therefore, it can be written as yᵃ.
Now from above ³√7 is in the radical form and we are told to convert it into exponent.
∴ ³√7 = (7)^1/3 [∵ ³√a = (a)^1/3 and '^' is the exponents sign]
or, ³√7 =(7)^(0.33) [∵ 1/3=0.33]
Hence the exponent form of ³√7 is (7)^1/3 or (7)^(0.33).