Q9 The areas of two similar triangles are respectively 16 cm² and 25 cm? Find the ratio of their corresponding sides.
Ops: A. 03:4
B. 02:3
C. 05:4
D. 04:5
YY7 and POR are 144 cm and 64 cm respectively. If the longest side of the niangle z , then the longest som
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Step-by-step explanation:
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velavarajvel
velavarajvel
30.01.2019
Math
Primary School
+5 pts
Answered
The areas of two similar triangles are 16 cm² and 25 cm² respectively. If the difference of their corresponding altitudes is 10 cm, find the lengths of altitudes.
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THE BRAINLIEST ANSWER!
Qvoeba26jd Ambitious
Here is your solution :
We know, Ar.(triangle1)/Ar.(triangle2) = Sq. of ratio of corresponding sides
Let the ratio be x:y
Then,
x^2/Y^2 = 16/25
(x/y)^2 = 16/25
x/y = 4/5.
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velavarajvel
I need the answer with all the steps and altitude
first thanks me
later
j will
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9229635622
9229635622 Ambitious
Answer:
Step-by-step explanation:
Area(triangle1)/Area(triangle2) = Square of ratio of the corresponding sides
Let the ratio be x:y
Then,
x2/Y2 = 16/25
(x/y)2 = 16/25
x/y = under root 16/25
X/y = 4/5