If you are asked to construct △APQ ∼ △ABC with the scale factor 35, which of the following is incorrect?
Given: In △ABC,AB=4cm, BC=3cm and ∠ABC=90∘.
A1A2=A2A3=A3A4=A4A5.
∠AA3P=∠AA5P
AP:PB=2:3
The following steps will give you the information on how to construct the similar triangle to △ABC.
Step 1: Draw a line AB = 4 cms.
Step2: Draw a line BC = 3 cm, perpendicular to AB passing through B.
Step 3: Join AC.
Step 4: Draw a ray AX, making an acute angle with line AB.
Step 5: Mark 5 points A1,A2,A3,A4 and A5 such that A1A2=A2A3=A3A4=A4A5.
Step 6: Join BA5.
Step 7: Draw a line parallel to BA5 passing through A3 by making an angle equal to ∠AA5B, intersecting AB at the point P.APAB=35.(This is the given scale factor of the smaller triangle which is the ratio of corresponding sides.)
Step 8: Draw a line parallel to BC passing through P, intersecting AC at Q.
Now we have constructed the triangle △APQ ∼ △ABC .
⇒∠BAC=∠PAQ,∠ABC=∠APQand∠ACB=∠PQA
Also,
APAB=PQBC=AQAC
We know that
APAB=35
Therefore, PQBC=35
⇒ 5PQ = 3BC.
From construction we have, A3P||A5B.
⇒∠AA3P=∠AA5B, because they are corresponding angles of parallel lines.
⇒ ∠AA3P≠∠AA5P
Consider triangle AA5B, the line A3P being parallel to A5B cuts the sides AB and AA5 in the same proportion.
⇒ AA3A3A5=APPB
APPB=32
∴ A3P will divide the line AB in the ratio 3:2.
Therefore, AP:PB≠2:3