ibysaiyan said:y=e^2x after integration
(1/2e^2x)
=>(1/2e^-(ln6)-(1/2^-(ln4) )
=>(1/2e^1/6) - (1/2e^1/4)
The formula for finding the area of a region bounded by the curve y=e^2x is ∫e^2x dx. This represents the integral of e^2x with respect to x, which can be solved using integration techniques.
The limits of integration for finding the area bounded by the curve y=e^2x depend on the specific region in question. Typically, the lower limit will be the x-value at which the curve intersects the x-axis, and the upper limit will be the x-value at which the curve intersects the y-axis. However, it is important to carefully analyze the graph of the curve to determine the appropriate limits.
No, the area of a region bounded by y=e^2x cannot be negative. The area under a curve is always a positive value, as it represents the space between the curve and the x-axis.
Yes, it is necessary to use calculus to find the area of a region bounded by y=e^2x. This is because the area under a curve is represented by an integral, which requires integration techniques to solve.
No, the area of a region bounded by y=e^2x cannot be infinite. While the curve may extend infinitely in both the positive and negative directions, the area under the curve will always be a finite value.