Consider a person on the moon who launches herself into a standing broad jump at 45 degrees. The average force generated during launching is, F = 2W and the distance over which this force acts is 60 cm. kindly compute: a. The range of the jumpSource https://www.physicsforums.com/threads/standing-broad-jump-on-the-moon.219530/
Obtain the differential equation of the system as shown in figure
Give the numerical coefficient of the term The numerical coefficient is ?
2. (25 pts) Numerical differentiation. Numerical implementation. a. Compute the forward, central, and backward numerical first derivative using, 2, 3, and 4 points for the function y = cos x at x = 7/4 using step size h = /12. Provide the results in the hard copy. Note that the central differences can only be apply for odd number of points ). b. Provide the analytic form of the derivatives, as well as table of the computed relative error for...
An unknown metal M reacts with S to form a compound with a formula M2S3. If 3.12g of m reacts with exactly 2.88g of sulfur, what are the names of metal M and compound M2S3?
Consider the same five-data pair (x, y) and- Find the first and second derivatives exactly at x = c. (c is any x in your data!)- Obtain the three-point forward difference formula for the second order derivative with a remainder by using the Taylor series expansion. Calculate f¢¢(c) by using this formula for the data given.- Obtain the three-point backward difference formula for the second order derivative with a remainder by using the Taylor series expansion. Calculate f¢¢(c) by using this formula for the data given.- Obtain the three-point central difference formula for the second order derivative with a remainder by using the Taylor series expansion. Calculate f¢¢(c) by using this formula for the data given.You can choose any five data pair.