Problem

Find the area under the given curve over the indicated interval. \[ y=x^{2} ;[2,3] \] The area under the curve is (Simplify your answer.)

Solution

Step 1 :The area under a curve from a to b is given by the definite integral from a to b of the function. In this case, the function is \(y = x^2\) and the interval is [2,3]. So, we need to calculate the definite integral of \(x^2\) from 2 to 3.

Step 2 :The definite integral of \(x^2\) from 2 to 3 is calculated as \(\int_{2}^{3} x^2 dx\).

Step 3 :After calculating the definite integral, we find that the area under the curve is \(\frac{19}{3}\).

Step 4 :Final Answer: The area under the curve over the indicated interval is \(\boxed{\frac{19}{3}}\).

From Solvely APP
Source: https://solvelyapp.com/problems/8418/

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