Simplify the given expression, using factors.
{eq}\displaystyle (x^2+3)^{-\dfrac 13} - \dfrac 2 3 x^2 (x^2 + 3)^{-\dfrac 43} {/eq}
Question:
Simplify the given expression, using factors.
{eq}\displaystyle (x^2+3)^{-\dfrac 13} - \dfrac 2 3 x^2 (x^2 + 3)^{-\dfrac 43} {/eq}
Simplification:
We can simplify a given expression by taking the common factor out from both the terms and then simplify the expression to make it simple. A number that divides both the number is called the common factor.
Answer and Explanation: 1
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View this answerWe have the expression {eq}\displaystyle (x^2+3)^{-\dfrac 13} - \dfrac 2 3 x^2 (x^2 + 3)^{-\dfrac 43} {/eq}
This can be simplified as follows:
$$\b...
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Learn more about this topic:
from
Chapter 7 / Lesson 12Learn how to simplify square roots. See examples including the square root of a fraction, the square root of variables, and square roots in the denominator.