Advertisements
Advertisements
प्रश्न
If x = (100)a , y = (10000)b and z = (10)c , find log`(10sqrty)/( x^2z^3)` in terms of a, b and c.
Advertisements
उत्तर
x = (100)a , y = (10000)b and z = (10)c
⇒ log x = alog 100, log y = b log 10000 and log z = clog 10
`"log"(10sqrty)/(x^2z^3)` = log10√y - log( x2z3 )
= log( 10y1/2 ) - logx2 - logz3
= log 10 + logy1/2 - logx2 - logz3
= log 10 + `1/2`log y - 2log x - 3log z
= 1 + `1/2log(10000)^b - 2log(100)^a - 3log(10)^c` ....(Since log 10 = 1 )
= 1 + `b/2log(10)^4 - alog(10)^2 - 3clog10`
= 1 + `b/2 xx 4log10 - 2 xx 2alog 10 - 3clog10`
= 1 + 2b - 4a - 3c
APPEARS IN
संबंधित प्रश्न
Given: log3 m = x and log3 n = y.
If 2 log3 A = 5x - 3y; find A in terms of m and n.
Express the following in terms of log 2 and log 3: `"log"root(5)(216)`
Write the logarithmic equation for:
F = `"G"("m"_1"m"_2)/"d"^2`
Express the following as a single logarithm:
`3"log"(5)/(8) + 2"log"(8)/(15) - (1)/(2)"log"(25)/(81) + 3`
Simplify the following:
`2"log" 7 + 3 "log" 5 - "log"(49)/(8)`
If log 4 = 0.6020, find the value of each of the following: log8
If log 4 = 0.6020, find the value of each of the following: log2.5
If log 27 = 1.431, find the value of the following: log 9
Simplify: log b ÷ log b2
Find the value of:
`("log"sqrt(8))/(8)`
