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Question
In fig. BP ⊥ AC, CQ ⊥ AB, A–P–C and A–Q–B then show that ΔAPB and ΔAQC are similar.
In ΔAPB and ΔAQC
∠APB = `square`° ...(i)
∠AQC = `square`° ...(ii)
∠APB ≅ ∠AQC ...[From (i) and (ii)]
∠PAB ≅ ∠QAC ...`square`
ΔAPB ~ ΔAQC ...`square`
Fill in the Blanks
Sum
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Solution
In ΔAPB and ΔAQC
∠APB = \[\boxed{90°}\] ...(i)
∠AQC = \[\boxed{90°}\] ...(ii)
∠APB ≅ ∠AQC ...[From (i) and (ii)]
∠PAB ≅ ∠QAC ...\[\boxed{[\text{Common angle}]}\]
ΔAPB ~ ΔAQC ...\[\boxed{[\text{AA test of similarity}]}\]
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