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Mathematics
If a, b, c are in G.P and xa = yb = zc, then
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Q. If $a, b, c$ are in G.P and $x^a = y^b = z^c$, then
COMEDK
COMEDK 2006
Sequences and Series
A
$ \log_y \, x = \log_z \, y$
31%
B
$ \log_x \, y = \log_z \, y$
31%
C
$ \log_z \, b = \log_c \,b$
22%
D
$ \log_b \, a = \log_c \, b$
16%
Solution:
Taking $\log$ in $x^a = y^b = z^c$
$ a \, \log \: x = b \, \log \,y = c \, \log \, z$
$ \frac{ \log \, x}{\log \,y} = \frac{b}{a} , \frac{\log \,y}{\log \, z} = \frac{c}{b}$
$\because \:\: a,b,c$ are in G.P,. $\:\:\: \therefore \frac{b}{a} = \frac{c}{b}$
$\therefore \frac{ \log \, x}{\log \,y} = \frac{\log \,y}{\log \, z } \Rightarrow \: \log_y x = \log_z y$