x square represents x times x than what does x root represents?
Answers
Answer:
write this question properly dude
Answer:
x(x^1/2) → x has a power of 1…simply add exponents of 1 and 1/2
(x^1)(x^1/2) → finding a common denominator of 2
(x^1(2)/2) (x^1/2) → continue by adding the numerators of the exponents x
(x^2/2)(x^1/2) → like terms multiplied together, their exponent are added
x^(2/2+1/2)
x^(1+1/2)
x ^3/2 !!!
= square root of x cubed or √x^3 !!!
Remember x^1/2 = square root of x or index of 2
Remember x^1/3 = cubed root of x or index of 3
Remember x^1/4 = fourth root of x or index of 4
In the above case we have:
x^3/2 = x^(3×1/2) = (x^3)^1/2 = √x^3
it’s got many names / aliases
x * sqrt(x) = x^(3/2) =third_root_of_x_squared = cube_of_square_root_of_x = sqrt(x)^3 = …
or you could go more aggressively
…=sixth root of the fourth power of x = ….
or an infinity of other concocted expressions …