Advertisements
Advertisements
प्रश्न
If a, b, c are in continued proportion, prove that: `(a + b)/(b + c) = (a^2(b - c))/(b^2(a - b)`.
उत्तर
`(a + b)/(b + c) = (a^2 (b - c))/(b^2 (a - b)`
Since, a, b, c are in continued proportion, `a/b = b/c`.
Let, `a/b = b/c = k`.
Then, a = bk and b = ck
Hence, a = bk = (ck). k = ck2
LHS = `(a + b)/(b + c)`
LHS = `(ck^2 + ck)/(ck + c)`
LHS = `[ck(k + 1)]/[c(k + 1)]`
LHS = `[cancelck(cancel(k + 1))]/[cancelc(cancel(k + 1))]`
LHS = k ...(I)
RHS = `(a^2(b - c))/(b^2(a - b)`
RHS = `((ck^2)^2(ck - c))/((ck)^2(ck^2 - ck)`
RHS = `(c^2k^4(ck - c))/(c^2k^2(ck^2 - ck))`
RHS = `(c^3k^4(k - 1))/(c^3k^3(k - 1))`
RHS = `[cancel(c^3)k^(cancel4)(cancel(k - 1))]/[cancel(c^3)(cancel(k - 1))]`
RHS = k ...(II)
From (I) and (II),
LHS = RHS
APPEARS IN
संबंधित प्रश्न
Find the mean proportional between `6 + 3sqrt(3)` and `8 - 4sqrt(3)`
Find the mean proportional between a – b and a3 – a2b
Find the mean proportional to (x – y) and (x3 – x2y).
Find two numbers whose mean proportional is 18 and the third proportional is 486.
If ax = by = cz, prove that
`x^2/(yz) + y^2/(zx) + z^2/(xy) = (bc)/a^2 + (ca)/b^2 + (ab)/c^2`.
If 2x – 1, 5x – 6, 6x + 2 and 15x – 9 are in proportion, find the value of x.
Find the value of x in each of the following proportions:
51 : 85 : : 57 : x
Write (T) for true and (F) for false in case of the following:
30 bags : 18 bags : : Rs 450 : Rs 270
If 24 workers can build a wall in 15 days, how many days will 8 workers take to build a similar wall?
If a, b, c and d are in proportion, prove that: `abcd [(1/a^2 + 1/b^2 + 1/c^2 + 1/d^2]` = a2 + b2 + c2 + d2
