Find final position of point by rotation -translation matric, Mathematics

Question:

A point in 3D is first rotated anticlockwise by 45 degrees about x axis,then translated along y axis by 2 units.Find the final position of the point if its initial position Is(1,1,1),by using appropriateĀ  rotation and translation matrices.

Posted Date: 2/16/2013 1:01:01 AM | Location : United States







Related Discussions:- Find final position of point by rotation -translation matric, Assignment Help, Ask Question on Find final position of point by rotation -translation matric, Get Answer, Expert's Help, Find final position of point by rotation -translation matric Discussions

Write discussion on Find final position of point by rotation -translation matric
Your posts are moderated
Related Questions
Write a program to find the area under the curve y = f(x) between x = a and x = b, integrate y = f(x) between the limits of a and b. The area under a curve between two points can b

Describe some Example of substitution method of Linear Equations with solution.

A farmer grows apples on her 400-acre farm and must cope with occasional infestations of worms. If she refrains from using pesticides, she can get a premium for "organically grown"

The owner of TMH Hospital wants to open a new facility in a certain area. He usually builds 25-, 50-, or 100-bed facilities, depending on whether anticipated demand is low, medium

As we saw in the previous section computing Laplace transforms directly can be quite complex. Generally we just utilize a table of transforms when actually calculating Laplace tran

a triangle is 180

I''m supposed to be writing a critique for my maths project where i compare the prices for different holidays. i don''t know what to write for a critique though, any tips on what w

all basic knowledge related to geometry

Three-person Problem of Points: Pascal, Fermat and their old friend the Chevalier de Mere each put $10.00 into a pot, and agree to play a game that has rounds. Each player has the

The equation ax2 + 2hxy + by2 =0 represents a pair of straight lines passing through the origin and its angle is tan q = Ā±2root under h2-ab/(a+b) and even the eqn ax2+2hxy+by2+2gx+