Prove that the ratio of the areas of two similar triangles is equal to the ratio of the squares of their corresponding sides. Apply the above theorem on the following:
$A B C$ is a triangle and $P Q$ is a straight line meeting $A B$ in $P$ and $A C$ in $Q$ . If $AP = 1 cm, PB = 3 cm, AQ = 1.5 cm, QC = 4.5 cm$ . Prove that the area of $∆ A P Q$ is one-sixteenth of the area of $∆ A B C$ .

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Solution

Step 1: Note the given data and draw a diagram
Let $A B C$ and $P Q R$ be two triangle similar triangle.
Since the triangles are similar, so
$\frac{A B}{P Q} = \frac{B C}{Q R} = \frac{A C}{P R}$ …..(i)
Let $A D$ and $P S$ be altitudes of $△ A B C$ and $△ P Q R$ respectively.
Step 2: Check similarity for $△ A D B$ and $△ P S Q$
AA similarity: If two angles of a triangle are respectively equal to two angles of another triangle, then the two triangles are similar.
$∠ A D B = ∠ P S Q = 90 °$
$∠ A B D = ∠ P Q S [∵ △ A B C ~ △ P Q R]$
According to AA similarity $△ A D B ~ △ P S Q$
So, $\frac{A D}{P S} = \frac{A B}{P Q}$ ……(ii)
From (i) and (ii) we get
$\frac{A B}{P Q} = \frac{B C}{Q R} = \frac{A C}{P R} = \frac{A D}{P S}$ ……(iii)
Step 3: Finding the ratio of areas of $△ A B C$ and $△ P Q R$
The area of a triangle is $= \frac{1}{2} \times B a s e \times h e i g h t$
$\frac{a r (△ A B C)}{a r (△ P Q R)} = \frac{\frac{1}{2} \times B C \times A D}{\frac{1}{2} \times Q R \times P S}$
$\frac{a r (△ A B C)}{a r (△ P Q R)} = \frac{B C \times B C}{Q R \times Q R}$ $[∵ \frac{A B}{P Q} = \frac{B C}{Q R} = \frac{A C}{P R} = \frac{A D}{P S}]$
$\frac{a r (△ A B C)}{a r (△ P Q R)} = \frac{B C^{2}}{Q R^{2}} = \frac{A C^{2}}{P R^{2}} = \frac{A B^{2}}{P Q^{2}}$
Hence proved
Step 4: Check the similarity of $△ A P Q$ and $△ A B C$
Given that $AP = 1 cm, PB = 3 cm, AQ = 1.5 cm, QC = 4.5 cm$
The length of $A B = A P + B P = 1 c m + 3 c m = 4 c m$
The length of $A C = A Q + Q C = 1.5 + 4.5 = 6 c m$
The ratio of the length of $A B$ and $A P$ is $\frac{A B}{A P} = \frac{4}{1} = 4$
The ratio of the length of $A C$ and $A Q$ is $\frac{A C}{A Q} = \frac{6}{1.5} = 4$
SAS similarity: If one angle of a triangle is equal to one angle of the other and the sides forming these angles are proportional the triangle similar.
In $△ A P Q & △ A B C$
$∠ A = ∠ A$ (common angle)
$\frac{A B}{A P} = \frac{A C}{A Q} = 4$
According to SAS similarity
$∴ △ A P Q ~ △ A B C$
Step 5: Finding the ratio of $area (△ APQ)$ and $area (△ ABC)$
So, by the given theorem
$\frac{area (△ APQ)}{area (△ ABC)} = \frac{{AP}^{2}}{{AB}^{2}}$
$\Rightarrow \frac{area (△ APQ)}{area (△ ABC)} = \frac{1^{2}}{4^{2}}$ $[∵ \frac{A B}{A P} = 4 \Rightarrow \frac{A P}{A B} = \frac{1}{4}]$
$\Rightarrow \frac{area (△ APQ)}{area (△ ABC)} = \frac{1}{16}$
$∴ area (△ APQ) = \frac{1}{16} \times area (△ ABC)$
Hence proved.

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