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प्रश्न
In ΔPQR, ∠P = 90°, PQ = 8 cm, QR = 17 cm. From midpoint M perpendiculars are drawn parallel to sides PQ and PR. Perimeter of rectangle PAMB is ______.
पर्याय
23 cm
25 cm
24 cm
26 cm
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उत्तर
In ΔPQR, ∠P = 90°, PQ = 8 cm, QR = 17 cm. From midpoint M perpendiculars are drawn parallel to sides PQ and PR. Perimeter of rectangle PAMB is 23 cm.
Explanation:
Given:
- ΔPQR with ∠P = 90°
- PQ = 8 cm
- QR = 17 cm
- M is the midpoint of QR
- Perpendiculars are drawn from M parallel to sides PQ and PR, forming rectangle PAMB.
We need to find the perimeter of rectangle PAMB.
Step 1: Find the length of PR
Using the Pythagorean theorem in ΔPQR:
`PR = sqrt(QR^2 - PQ^2)`
= `sqrt(17^2 - 8^2)`
= `sqrt(289 - 64)`
= `sqrt(225)`
= 15 cm
Step 2: Coordinates setup (optional for clarity)
Let’s place the triangle on the coordinate plane:
- P = (0, 0)
- Q = (8, 0) (since PQ = 8)
- R = (0, 15) (since PR = 15)
Step 3: Find the midpoint M of QR
Coordinates of Q = (8, 0) and R = (0, 15), so midpoint M is
`M = ((8 + 0)/2, (0 + 15)/2) = (4, 7.5)`
Step 4: Find points A and B
- From M, draw perpendiculars parallel to PQ and PR.
- PQ is along the x-axis (horizontal), so the line parallel to PQ through M is horizontal y = 7.5.
- PR is along the y-axis (vertical), so the line parallel to PR through M is vertical x = 4.
- A is on PR (the y-axis), so A = (0, 7.5).
- B is on PQ (the x-axis), so B = (4, 0).
Step 5: Calculate the lengths of sides of rectangle PAMB
- PA = distance between P(0, 0) and A(0, 7.5) = 7.5 cm
- PB = distance between P(0, 0) and B(4, 0) = 4 cm
Step 6: Calculate perimeter of PAMB
The perimeter of rectangle PAMB is
2 × (PA + PB)
= 2 × (7.5 + 4)
= 2 × 11.5
= 23 cm
