1 votes 1 votes If $\log_{x}y=100$ and $\log_{2}x=10$, then the value of $y$ is : $2^{10}$ $2^{100}$ $2^{1000}$ $2^{10000}$ Quantitative Aptitude nielit2017dec-assistanta numerical-ability logarithms + – Lakshman Bhaiya asked Mar 31, 2020 • recategorized Sep 11, 2020 by Lakshman Bhaiya Lakshman Bhaiya 13.7k points 1.1k views answer comment Share See all 0 reply Please log in or register to add a comment.
2 votes 2 votes Option C is correct. Hira Thakur answered May 25, 2020 Hira Thakur 7.1k points comment Share See all 0 reply Please log in or register to add a comment.
0 votes 0 votes Given that, $\log_{x}y = 100$ and $\log_{2}x = 10$ $\implies \dfrac{\log_{2}y}{\log_{2}x} = 100$ $\implies \dfrac{\log_{2}y}{10} = 100$ $\implies \log_{2}y = 1000$ $\implies y = 2^{1000}.$ So, the correct answer is $(C).$ Lakshman Bhaiya answered Sep 11, 2020 Lakshman Bhaiya 13.7k points comment Share See all 0 reply Please log in or register to add a comment.