Find the area between the curve and the x axis from [-1,5] .
f(x)=5x2-3x+4 .Use the Fundamental Theorem of
Calculus.
Find the Area using Right Hand Riemann Sums with n=10
Explain the difference between the two methods. Which of the two
methods is more accurate? How can you make the less accurate way
more accurate without changing the process?
F(x) = 0 + 2x + (4* x^2)/2! + (3*x^3)/3! + .....
This is a taylors series for a function and I'm assuming there
is an inverse function with an inverse taylors series, I am trying
to find as much of the taylors series of the inverse function
(f^-1) as I can
Estimate the area between the graph of f(x) = x3 − 12x and the
x-axis over the interval [−2, 1] using n = 6 rectangles and right
endpoints. Draw thecorresponding rectangles as well.
I want to to calculate the area between the x-axis and the
function f(x) = sin(x) on the interval [0, pi]. The area we seek is
enclosed in a rectangle bounded by the curves. x = 0, x = pi, y =
0, y = 1. Since we know the area of the rectangle is pi, we can
generate random points inside the rectangle and keep track of how
many of those points lie below the curve y = sin(x)....
Consider the region R between the x-axis and the curve y = x^3 /
3 , between x = 0 and x = 1.
(a) Calculate the surface area of the solid obtained by
revolving R about the x-axis.
(b) Write an integral for the the surface area of the solid
obtained by revolving R about the y-axis
Find the area between the curve and the x-axis over the
indicated interval.
y = 100 − x2;
[−10,10]
The area under the curve is ___
(Simplify your answer.)
area between curves
1. Find the area between x=1 and x=3 for: f(x) = x+4 and
g(x)=1
2. Find the area between x =-1 and x=1 for: f(x) = 2-x^2 and
g(x) =3
3. find the area between: f(x) = x^2 and g(x) = 2x+3
4. find the area between: f(x) = 4-x^2 and g(x) =3x