∫0 dx
The integral notation ∫ represents the mathematical operation of integration
The integral notation ∫ represents the mathematical operation of integration. In this case, ∫0 dx means integrating the variable “x” from 0 to an unspecified upper limit.
When integrating, you are essentially finding the area under the curve of a function. In this case, since there is no specific function provided, we will consider integrating the differential of x, which is equal to 1. Therefore, the integral of dx with respect to x is just the variable x itself.
Now, when integrating from 0 to an unspecified upper limit, we indicate the upper limit by a vertical bar on the right side of the integral sign. So the integral of dx from 0 to x can be written as: ∫0^x dx.
To evaluate this integral, we simply substitute the upper limit (x) into the integrand and subtract the value of the integrand at the lower limit (0). Therefore, the solution to ∫0 dx is simply:
∫0 dx = x – 0 = x
In other words, the integral of dx with respect to x, when integrating from 0 to x, equals just the variable x itself.
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