Question

Find the area of the region bounded by the graphs of the equations. Then use a graphing utility to graph the region and verify your answer. $$ y=\left(x^{2}-1\right) e^{x}, y=0, x=-1, x=1 $$

Short answer

After calculating all the integrals, the final area will be the result of the computed integral. It can then be verified by comparing it to the area under the curve on a graphing utility.

Step-by-step solution

Analyze and setup the inegral

The area under the curve \( y = (x^{2}-1)e^{x} \) between \( x=-1 \) and \( x=1 \) is given by the definite integral \( \int_{-1}^{1} (x^{2}-1)e^{x} dx \)

Compute the integral

Use the integration by parts formula, which states that \( \int u dv = u v - \int v du \). We choose \( u = x^{2}-1 \) and \( dv = e^{x} dx \). So we get \(du = 2x dx\) and \(v = e^{x}\). The integral becomes \( uv - \int v du = (x^{2}-1)e^{x} - \int 2xe^{x} dx \) from \( x=-1 \) to \( x=1 \). Now we need to solve the integral \( \int 2xe^{x} dx \). For this integral, we can again use integration by parts. Now let \( u = x \) and \( dv = 2e^{x} dx \), so we get \( du = dx \) and \( v = 2e^{x} \). The integral \( \int 2xe^{x} dx = uv - \int v du \), evaluated from \( x=-1 \) to \( x=1 \), becomes \( x*2e^{x} - \int 2e^{x} dx \), which simplifies to \( x*2e^{x} - 2e^{x} \). Before solving, ensure to add this value back to the first solution. After solving, we acquire the final area.

Calculate the final result

After calculating the integral, the final area will be obtained.

Verify through Graphing Utility

Graph the function using a graphing utility. The region bounded by the given equations should show the area that we computed, thus verifying our calculations.

Key concepts

Area Under the Curve

When we talk about the "area under the curve," we refer to the space between the graph of a function and the x-axis over a specific interval. This area can be found using a definite integral. In our example, the function is given by the equation \( y = (x^2 - 1)e^x \) and we want to find the area under this curve from \( x = -1 \) to \( x = 1 \).

To set up this integral, we recognize the area we're searching for by framing it with these bounds on the x-axis: \( x = -1 \) and \( x = 1 \). The area is given by:

• \( \int_{-1}^{1} (x^2 - 1)e^x \, dx \)

Using integration, we can compute this and it will result in the particular numeric area covered under, above, and along the curve within these limits. This geometric area calculation is foundational in understanding how different curves behave between any given boundaries.

Integration by Parts

Integration by parts is a useful technique when dealing with integrals involving products of functions. If you're familiar with the product rule from differentiation, you can think of integration by parts as its counterpart. The formula for integration by parts is:

• \( \int u \, dv = uv - \int v \, du \)

In our problem, we notice that an integral like \( \int (x^2 - 1)e^x \, dx \) involves a polynomial multiplied by an exponential function, which signals us to use integration by parts. Here’s a breakdown:

Assignment:

• \( u = x^2 - 1 \), giving \( du = 2x \, dx \)
• \( dv = e^x \, dx \), providing \( v = e^x \)

This allows us to transform the integral into manageable parts. But we notice a second integration by parts is necessary for the resulting equation \( \int 2xe^x \, dx \). Thus, patience and careful algebraic manipulation lead us through the process, ultimately solving for the precise area.

Graphing Utility

To verify our calculated area under the curve, we can use a graphing utility. A graphing utility is a vital tool that helps illustrate functions visually, providing us with an instant view of what's happening between our chosen bounds.

Once you input the function \( y = (x^2 - 1)e^x \) into the graphing tool, you can clearly see the region bounded by this curve and the x-axis from \( x = -1 \) to \( x = 1 \). This visual depiction should match your calculated area, confirming your integration work and showing the practical application of integral calculus in understanding geometrical regions.

By comparing the shaded area in the graph to your calculated results, it becomes easier to grasp abstract mathematical operations, making these concepts more concrete and believable. This not only verifies accuracy but also boosts your confidence in employing integration techniques.