Make some changes, and try to clarify ur concepts.
remember me in ur prayers.
ProblemsView more random threads:
- MTH302 Business Mathematics & Statistics Assignment No.1...
- CS301 Assignment No. 03 SEMESTER Spring 2011 idea solution
- CS201 - Introduction to Programming All spring assignments...
- CS502 Fundamental of Algorithms Assignment No.1 Spring...
- CS304 Object Oriented Programming assignment no 3 idea...
- CS615 Software Project Management assignment no 4 fall 7...
- Software Engineering-1 (CS504) Assignment 2 fall 2010...
- CS401 Computer Architecture and Assembly Language...
- CS508 Modern Programming Languages Assignment no 3 solution...
- MTH301 Calculus II Assignment No.2 Solution Spring Semester...
Q 1) Show the steps required to rotate point P(x, y) by an angle β about the origin
to P’ (x’, y’) as shown in following diagram. Also show the final matrix form.
(Marks 10)
Q 2) Write down the steps required to rotate a point (x, y) about an arbitrary
point (px, py). (Marks 10)
Solution will be updated soon.
Urgent call: 03455242488. | Virtual University Assignments
Virtual University GDBs | Virtual University Papers | Vu Projects | Vu Handouts
About Expert
Make some changes, and try to clarify ur concepts.
remember me in ur prayers.
thanks for uploading the solution.
Urgent call: 03455242488. | Virtual University Assignments
Virtual University GDBs | Virtual University Papers | Vu Projects | Vu Handouts
About Expert
Thank You So Much Miss Farah
From Imran Hameed
+923126949969
is there anyone have CS401_2 solution please shared ...... I m urgently need..
yes that solution is also uploaded
Sponsored Links
Urgent call: 03455242488. | Virtual University Assignments
Virtual University GDBs | Virtual University Papers | Vu Projects | Vu Handouts
About Expert
Answer No.02
1. First we have to translate the arbitrary point in such a way that is should coincide with the origin.
2. Then the remaining procedure is the same as in the first question.
3. After rotating the point, then we have to translate back the arbitrary point to its original position. And the rotation is done.
Urgent call: 03455242488. | Virtual University Assignments
Virtual University GDBs | Virtual University Papers | Vu Projects | Vu Handouts
About Expert
There are currently 1 users browsing this thread. (0 members and 1 guests)