Approximate the arc length of the curve over the interval using
Simpson’s Rule SN with ?=8. ?=2?^(−?^2), on ?∈[0,2] (Use decimal
notation. Give your answer to four decimal places.) ?8≈
Approximate the arc length of the curve over the interval using
Simpson’s Rule SN with N=8.
y=7e^(−x2) on x∈[0,2]
(Use decimal notation. Give your answer to four decimal
places.)
By using arc-length, determine the
angular size of the Moon as seen from Earth. Also, determine the
angular size of the Sun as seen from Earth.
show full steps please
Predict the form of the solution (study limits) and find all of
the solutions using the Frobenius method approach. Write indicial
equation, find its roots, the recurrence relation, and the first
four terms terms of each series solution for xy"+y'+x^2y=0
Determine the following : a) what is the angle formed by an arc
length of 3 radii?
b) what is the angle formed by an arc length of 1 radii?
c) what is the angle formed by an arc length of pi/2 radii?
d) what is the angle formed by an arc length of 4pi/3 radii?
Given v′(t)=2ti+j, find the arc length of the curve v(t) on the
interval [−2,3]. You may use technology to approximate your
solution to three decimal places.