find the length of the daigonal if the area of the quadrilateral PQRS is 60 cm²
Answers
Answer:
Step-by-step explanation:
► GiveN:
Perpendicular from R to diagonal QS = 4 cm
Perpendicular from P to diagonal QS = 6 cm
Area of the quadrilateral = 60 cm²
► To FinD:
Find the length of the diagonal QS....?
How to solve?
Here, area of the quadrilateral is the sum total of area of the two triangles. And, we know the height of these triangles and base is common but it's measure is unknown. So, we can form an equation and get the required result.
Working out:
We have,
Area of the quadrilateral = 60 cm²
Area of the quadrilateral PQRS = Area of triangle QRS + Area of triangle PQS.
Formula to find area:
So,
➝ Area of PQRS = Area of △QRS + Area of △PQS
➝ Area of PQRS = 1/2 × RT × QS + 1/2 × PU × QS
➝ Area of PQRS = 1/2 QS (RT + PU)
Putting the values given in Q.
➝ 60 cm² = 1/2 QS (4 cm + 6 cm)
➝ 60 cm² = 1/2 × 10 cm × QS
➝ 60 cm² = 5 cm × QS
➝ QS = 60 cm² / 5 cm
➝ QS = 12 cm
Final result:
Length of the diagonal QS = 12 cm.
Answer:
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Step-by-step explanation:
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