The area under a curve represents the total accumulation of a quantity over an interval and is an essential concept in mathematics, especially when dealing with calculus or solving real-world problems ...

Before we start, you’ll need to have data points for both the x and y coordinates of the curve. Depending on your specific problem, you may have this information already, or you may need to generate ...

To calculate the area between a curve and the \(x\)-axis we must evaluate using definite integrals. First, we need to find out where the curve cuts the \(x\)-axis. Remember, a curve cuts the ...