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प्रश्न
In a trapezium ABCD, AB || DC. A line parallel to AC cuts AB at P and BC at Q. Prove that area (ΔАPD) = area (ΔACQ).
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उत्तर
Given:
ABCD is a trapezium with AB || DC.
A line through P on AB and Q on BC is drawn so that PQ || AC.
To Prove: area (ΔAPD) = area (ΔACQ).
Proof [Step-wise]:
1. Coordinate setup: Put A at (0, 0), AB on the x-axis and DC parallel to AB at y = –h (h > 0).
Thus, take B = (b, 0), D = (0, –h), C = (c, –h).
Let P = (p, 0) be the given point on AB (0 ≤ p ≤ b).
This choice preserves AB || DC and places A, B on one horizontal line and D, C on a parallel horizontal line.
2. Area of ΔAPD: Points A(0, 0), P(p, 0), D(0, –h) give a triangle with base AP = p and height h.
Hence, area (ΔAPD)
= `1/2` × base × height
= `1/2` × p × h
3. Equation of AC and of the line through P parallel to AC:
AC has slope `-h/c`, so any line parallel to AC has equation `y = (-h/c)(x - s)` for some s.
The line through P(p, 0) is `y = (-h/c)(x - p)`.
4. Equation of BC: Line through B(b, 0) and C(c, –h) has slope `m = -h/(c - b)`.
So, `BC: y = [-h/(c - b)](x - b)`.
5. Find Q as intersection of the two lines PQ and BC.
Equate `(-h/c)(x - p) = (-h/(c - b))(x - b)`.
Cancel –h (nonzero) and solve:
`(1/c)(x - p) = (1/(c - b))(x - b)`
⇒ (c – b)(x – p) = c(x – b)
⇒ `x = c + p(1 - c/b)`
Call this xQ.
6. Compute area of ΔACQ using A(0, 0), C(c, –h), Q(xQ, yQ).
With A at origin,
`"area" (ΔACQ) = 1/2 |x_C xx y_Q - x_Q xx y_C|`
= `1/2 |c xx y_Q + h xx x_Q|`
Use yQ from BC :
`y_Q = [-h/(c - b)](x_Q - b)`
Then `c xx y_Q + h xx x_Q = h xx b/(c - b) xx (c - x_Q)`.
7. Substitute xQ found in step 5:
`c - x_Q = p xx (c - b)/b`
Hence, c × yQ + h × xQ
= `h xx b/(c - b) xx p xx (c - b)/b`
= h × p
8. Therefore, area (ΔACQ)
= `1/2 xx (h xx p)`
= `1/2 xx p xx h`
9. Compare with step 2:
area (ΔAPD)
= `1/2 xx p xx h`
= area (ΔACQ)
area(ΔAPD) = area(ΔACQ), as required.
