Find the area between the curve y = e X and the x-axis from x = 0 to o. square unit -2x 1

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**Problem Statement:** Find the area between the curve \( y = e^{-2x} \) and the x-axis from \( x = 0 \) to \( \infty \). **Diagram Explanation:** The graph shown represents the exponential curve \( y = e^{-2x} \). It is plotted against the x-axis. **Graph Details:** - **Axes:** - The vertical axis is labeled as \( y \). - The horizontal axis is labeled as \( x \). - **Curve:** - The curve begins at the point (0,1) where it intersects the y-axis at \( y = 1 \). - The curve decreases asymptotically towards the x-axis as \( x \) increases, approaching infinity. - **Shaded Area:** - The area between the curve and the x-axis from \( x = 0 \) to \( x = \infty \) is shaded. This represents the region whose area needs to be calculated and is referred to as "1 square unit" as noted in the blank provided in the problem. This scenario involves calculating an improper integral to find the area under the curve, which represents the total area of the shaded region.