state and prove areas of 2 similar triangles
Answers
Answer:
If two triangles are similar, then the ratio of the area of both triangles is proportional to the square of the ratio of their corresponding sides.
Step-by-step explanation:
To prove this theorem, consider two similar triangles ΔABC and ΔPQR;
According to the stated theorem,
area of ΔABCarea of ΔPQR = (ABPQ)2 =(BCQR)2 = (CARP)2
As, Area of triangle = 12 × Base × Height
To find the area of ΔABC and ΔPQR, draw the altitudes AD and PE from the vertex A and P of ΔABC andΔPQR, respectively, as shown in the figure given below:
Theorems on area of similar triangles
Now, area of ΔABC = 12 × BC × AD
area of ΔPQR = 12 × QR × PE
The ratio of the areas of both the triangles can now be given as:
area of ΔABCarea of ΔPQR = 12×BC×AD12×QR×PE
⇒ area of ΔABCarea of ΔPQR = BC × ADQR × PE ……………. (1)
Now in ∆ABD and ∆PQE, it can be seen that:
∠ABC = ∠PQR (Since ΔABC ~ ΔPQR)
∠ADB = ∠PEQ (Since both the angles are 90°)
From AA criterion of similarity ∆ADB ~ ∆PEQ
⇒ ADPE = ABPQ …………….(2)
Since it is known that ΔABC~ ΔPQR,
ABPQ = BCQR = ACPR …………….(3)
Substituting this value in equation (1), we get
area of ΔABCarea of ΔPQR = ABPQ × ADPE
Using equation (2), we can write
area of ΔABCarea of ΔPQR = ABPQ × ABPQ
⇒area of ΔABCarea of ΔPQR =(ABPQ)2
Also from equation (3),
area of ΔABCarea of ΔPQR = (ABPQ)2 =(BCQR)2 = (CARP)2
This proves that the ratio of the area of two similar triangles is proportional to the squares of the corresponding sides of both the triangles.
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