Advertisements
Advertisements
प्रश्न
Given: log3 m = x and log3 n = y.
Write down `3^(1 - 2y + 3x)` in terms of m and n.
Advertisements
उत्तर
log3m = x
log3n = y
31−2y+3x
Since log3m = x, then by definition of logarithms:
m = 3x and n = 3y
31−2y+3x = 31 ⋅ 3−2y ⋅ 33x
Replace powers
31 = 3
33x = (3x)3 = m3
3−2y = (3y)−2 = n−2
31−2y+3x = 3 ⋅ n−2 ⋅ m3
`3 . m^3/n^2`
APPEARS IN
संबंधित प्रश्न
If 3( log 5 - log 3 ) - ( log 5 - 2 log 6 ) = 2 - log x, find x.
If log (a + b) = log a + log b, find a in terms of b.
If log10 a = b, find 103b - 2 in terms of a.
If log (a + 1) = log (4a - 3) - log 3; find a.
Express the following in terms of log 2 and log 3: log 36
Express the following in terms of log 2 and log 3: `"log" root(3)(144)`
Express the following in terms of log 2 and log 3: `"log"(26)/(51) - "log"(91)/(119)`
Express the following as a single logarithm:
`2"log" (16)/(25) - 3 "log" (8)/(5) + "log" 90`
If 2 log x + 1 = 40, find: log 5x
If 2 log y - log x - 3 = 0, express x in terms of y.
