Advertisements
Advertisements
प्रश्न
If `x/a = y/b = z/c`, prove that `"ax - by"/((a + b)(x- y)) + "by - cz"/((b + c)(y - z)) + "cz - ax"/((c + a)(z - x)` = 3
उत्तर
`x/a = y/b = z/c`
∴ x = ak, y = bk, z = ck
L.H.S. `"ax - by"/((a + b)(x- y)) + "by - cz"/((b + c)(y - z)) + "cz - ax"/((c + a)(z - x)`
= `"a.ak - b.bk"/((a + b)(ak - bk)) + ".bk - c.ck"/((b + c)(bk - ck)) + "c.ck - a.ak"/((c + a)(ck - ak)`
= `(a^2k - b^2k)/((a + b)k(a - b)) + (b^2k^2)/((b + c)k(b - c)) + (c^2k - a^2k)/((c + a)(c - a)`
= `(k(a^2 - b^2))/(k(a^2 - b^2)) + (k(b^2 - c^2))/(k(b^2 - c^2)) + (k(c^2 - a^2))/(k(c^2 - a^2)`
= 1 + 1 + 1
= 3
= R.H.S.
APPEARS IN
संबंधित प्रश्न
If x2, 4 and 9 are in continued proportion, find x.
If p + r = mq and `1/q + 1/s = m/r`; then prove that p : q = r : s.
Find the fourth proportion to the following:
(p2q - qr2 ), (pqr - pr2 ) and (pq2 - pr2)
Find the value of x in the following proportions : 2.5 : 1.5 = x : 3
If b is the mean proportional between a and c, prove that (ab + bc) is the mean proportional between (a² + b²) and (b² + c²).
If a, b, c are in continued proportion, prove that: abc(a + b + c)3 = (ab + bc + ca)3
Choose the correct answer from the given options :
If x, 12, 8 and 32 are in proportion, then the value of x is
Find two numbers whose mean proportional is 16 and the third proportional is 128.
10 books is to 15 books as 3 books is to 15 books
Write True (T) or False (F) against the following statement:
16 : 24 : : 20 : 30
