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Question: ABCD is a square. F is the mid-point of AB. BE is one third of BC . If the area of triangle FBE=108 ...

ABCD is a square. F is the mid-point of AB. BE is one third of BC . If the area of triangle FBE=108 sq. cm., find the length of AC.

Explanation

Solution

Hint: Draw a diagram to understand the geometry better. Let the length of a side of the square ABCD be 2x cm. find the lengths of AF, FB, BE and EC in terms of x. then use the formula area of triangle FBE = 12×\dfrac{1}{2}\times FB ×\times BE and equate that to 108 to find x. Now use the formula the length of the diagonal of a square is side2side\sqrt{2} to arrive at the final answer.

Complete step-by-step answer:
In this question, we are given that ABCD is a square. F is the mid point of AB. BE is one third of BC . The area of triangle FBE = 108 sq. cm.
We need to find the length of the diagonal AC.
Let the length of the side of the square ABCD be 2x cm.
Then, the length of AF will be equal to the length of FB which will be equal to the half of the length of the side of the square ABCD.
i.e. AF = FB = 2x2=x\dfrac{2x}{2}=x cm
We assumed the side of the square as 2x then the length of BE will be equal to one third of the length of the side of the square ABCD. The length of EC will be equal to two thirds of the length of the side of the square ABCD.
i.e. BE = 2x3\dfrac{2x}{3} cm. and EC = 4x3\dfrac{4x}{3} cm.
We can see the things found above in the following figure:

Now, we are given that area of the triangle FBE = 108 sq. cm.
We know that area of a triangle = 12×\dfrac{1}{2}\times base ×\times height
We see that triangle FBE is a right angled triangle.
So, area of triangle FBE = 12×\dfrac{1}{2}\times FB ×\times BE
So, 12×\dfrac{1}{2}\times FB ×\times BE = 12×x×2x3=108\dfrac{1}{2}\times x\times \dfrac{2x}{3}=108 sq. cm.
x23=108\dfrac{{{x}^{2}}}{3}=108
x2=324{{x}^{2}}=324
x=18x=18 cm.
So, 2x=362x=36 cm
This is the length of a side of the square ABCD.
Now, we need to find the length of the diagonal AC.
We know that the length of the diagonal of a square is side2side\sqrt{2}
So, the length of AC is 36236\sqrt{2} cm.

Note: In this question, it is very important to know the following:
area of a triangle = 12×\dfrac{1}{2}\times base ×\times height, and that the length of the diagonal of a square is equal to side2side\sqrt{2}. Making a relevant diagram is essential for such type of questions.