Let g(x) be a function defined on R such that g′′(x)= 1/(1+x^2), g(0)=0 and g′(0)=0. Use the Mean Value Theorem to show that for any x ≥ 0, g'(x) ≤ x This is for early calculus AB, so we haven't learned about integrals or antiderivatives yet. We just learned about the first and second derivative tests, the mean value theorem, etc.
Riemann Sum
Riemann Sums is a special type of approximation of the area under a curve by dividing it into multiple simple shapes like rectangles or trapezoids and is used in integrals when finite sums are involved. Figuring out the area of a curve is complex hence this method makes it simple. Usually, we take the help of different integration methods for this purpose. This is one of the major parts of integral calculus.
Riemann Integral
Bernhard Riemann's integral was the first systematic description of the integral of a function on an interval in the branch of mathematics known as real analysis.
Let g(x) be a function defined on R such that g′′(x)= 1/(1+x^2), g(0)=0 and g′(0)=0.
Use the Mean Value Theorem to show that for any x ≥ 0,
g'(x) ≤ x
This is for early calculus AB, so we haven't learned about integrals or antiderivatives yet. We just learned about the first and second derivative tests, the mean value theorem, etc.
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