Step 1. Now, extend RQ to S and with P as centre and with a sufficient radius, draw an arc, cutting SO at A and 8. |
Step 2. Along QX, set off \[QP=3.5\text{ }cm.\] |
Step 3. Draw a line segment \[QR=4.2\text{ }cm\]and construct\[\angle RQX={{120}^{o}}\]. |
Step 4. Joint PR. |
Step 5. Joint PC, meeting RQ product at |
M. Then. \[PM\bot QS\] |
Step 6. With A as centre and radius more than half AB, draw an arc. Now with B as centre and with the same radius draw another arc, cutting the previous arc at C. |
A) 1\[\to \]2\[\to \]3\[\to \]4\[\to \]5\[\to \]6
B) 4\[\to \]1\[\to \]2\[\to \]3\[\to \]5\[\to \]6
C) 2\[\to \]4\[\to \]3\[\to \]1\[\to \]5\[\to \]6
D) 3\[\to \]2\[\to \]4\[\to \]1\[\to \]6\[\to \]5
Correct Answer: D
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