Comprehensive questions and detailed answers for Unit 3: Two-Dimensional Geometric Transformations (5 Hrs.). Perfect for exam preparation and concept clarity.
Given a triangle with vertices A(2,3), B(5,5), C(4,3) by rotating 90 degrees about the origin and then translating two units in each direction. Use the homogeneous transformation matrix to find the new vertices of the triangle.
Reflect a line segment having end points (9,3) and (12,10) about a line X=7. Draw initial and final result graph as well.
Find the composite transformation matrix for reflection about a line y=mx+c.
Reflect a line segment having endpoints (9,3) and (12,10) about a line Y=7. Draw initial and final result graph as well.
Find the new c-ordinate of the triangle ABC, with co-ordinates A(0, 0), B(1, 1) and C(5, 2) after it has been magnified to twice of its size.
Translate a triangle ABC with co-ordinates A(0, 0), B(5, 0) and C(5, 5) by 2 units in x-direction and 3 units in y-directions.
And more questions available on this page.