length of the diagonal of a square is s√2 unit find the side and area of the square.
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Answered by
6
Solution :
Let side of the square = a units
diagonal ( d ) = s√2
=> √2 a = s√2
=> a = s
Area of the square (A) = a² square units.
Therefore,
Side of the square = a units
Area of the square = a² square units.
••••
Let side of the square = a units
diagonal ( d ) = s√2
=> √2 a = s√2
=> a = s
Area of the square (A) = a² square units.
Therefore,
Side of the square = a units
Area of the square = a² square units.
••••
Answered by
4
Hey there!
Answer:
Side = a ; Area = a²
Step-by-step explanation:
Given,
Diagonal of square = s√2
√2 × a = s × √2
Removing √2 from both sides,
a = s.
or, side = a.
Now,
Area = side² = a².
Hope It Helps You!
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