Step 1 :

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(a)

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The function is $\"\"$ .

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A function $\"image\"$ is said to be one to one if any two elements in the domain are correspond to two different elements in the range.

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If $\"image\"$ and $\"image\"$ are two different inputs of a function $\"image\"$ , then $\"image\"$ is said to be one to one provided $\"image\"$ .

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Let $\"\"$ and $\"\"$ .

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$\"\"$

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$\"\"$

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$\"image\"$ .

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Since $\"image\"$ , the function $\"\"$ is said to be one-to-one function.

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Step 2 :

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(c)

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The function is $\"\"$ .

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Let $\"\"$ .

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To find the inverse of $\"image\"$ , replace x with y and y with x.

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$\"\"$

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Solve for y.

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$\"\"$ .

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The inverse of the function $\"\"$ is $\"\"$ .

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The domain of a function is all values of x, those makes the function mathematically correct.

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Since there shouldnot be any negative numbers in the cube root.

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So, the domain of the above function is all non negative real numbers.

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Domain of the inverse function is $\"image\"$

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Range set is the corresponding values of the function for different values of x.

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Since for all non negative real numbers of x, the function is greater than equals to zero.

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The range of the function is always greater than or equal to zero.

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Range of the inverse function is : $\"\"$ .

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Step 3:

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(b)

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The inverse function is $\"\"$ .

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Differentiate the function with respect to x.

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$\"\"$

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Apply power rule of derivatives : $\"\"$ .

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$\"\"$

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Find $\"\"$ at $\"\"$ .

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$\"\"$

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$\"\"$ .

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Step 4 :

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(d)

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$\"\"$ .

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At $\"\"$ , $\"\"$ .

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Step 5 :

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(e)

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The graph of $\"\"$ and $\"\"$ is :

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$\"\"$

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Solution :

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(a) The function $\"\"$ is said to be one-to-one function.

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(b) $\"\"$ .

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(c)

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The inverse function is $\"\"$ , and its domain and range is $\"image\"$ and $\"\"$ .

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(d) $\"\"$ .

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(e)

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The graph is :

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$\"\"$