Point q belongs to side ab of square abcd. The distances from point q to the diagonals of the square are 2 ft and 3 ft. Find the diagonal of the square.
Answers
Answer:
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Step-by-step explanation:
Lets assume that there are 2 lines from the point Q that are perpendicular to the diagonals of the square ( QM and QN ).
Lets assume that there are 2 lines from the point Q that are perpendicular to the diagonals of the square ( QM and QN ). QM = 2 ft and QN = 3 ft.
Lets assume that there are 2 lines from the point Q that are perpendicular to the diagonals of the square ( QM and QN ). QM = 2 ft and QN = 3 ft.Then : QM + QN = d/2 ( d is the diagonal )
Lets assume that there are 2 lines from the point Q that are perpendicular to the diagonals of the square ( QM and QN ). QM = 2 ft and QN = 3 ft.Then : QM + QN = d/2 ( d is the diagonal )2 + 3 = d/2
Lets assume that there are 2 lines from the point Q that are perpendicular to the diagonals of the square ( QM and QN ). QM = 2 ft and QN = 3 ft.Then : QM + QN = d/2 ( d is the diagonal )2 + 3 = d/2d = 5 * 2
Lets assume that there are 2 lines from the point Q that are perpendicular to the diagonals of the square ( QM and QN ). QM = 2 ft and QN = 3 ft.Then : QM + QN = d/2 ( d is the diagonal )2 + 3 = d/2d = 5 * 2 d = 10 ft
Lets assume that there are 2 lines from the point Q that are perpendicular to the diagonals of the square ( QM and QN ). QM = 2 ft and QN = 3 ft.Then : QM + QN = d/2 ( d is the diagonal )2 + 3 = d/2d = 5 * 2 d = 10 ftAnswer: The diagonal of the square is 10 ft long.