If $${log _a}left( {ab} right) = x{text{,}},$$ then $${log _b}left( {ab}
If $${log _a}left( {ab} right) = x{text{,}},$$ then $${log _b}left( {ab} right)$$ is –
If $$log 2 = 0.30103,$$ the number of digits in $${4^{50}}$$ is –
If $$log 2 = 0.30103,$$ the number of digits in $${4^{50}}$$ is –
If $${log _{10}}2 = a$$ and $${log _{10}}3 = b,$$ then $${log _5}12$$ = ?
If $${log _{10}}2 = a$$ and $${log _{10}}3 = b,$$ then $${log _5}12$$ = ?
The number of digits in $${{text{4}}^9} times {{text{5}}^{17}}{text{,}}$$ wh
The number of digits in $${{text{4}}^9} times {{text{5}}^{17}}{text{,}}$$ when expressed in usual form, is –
If $${log _{10}}125 + {log _{10}}8 = x,$$ then x is equal to –
If $${log _{10}}125 + {log _{10}}8 = x,$$ then x is equal to –
If $$log 3log left( {{3^x} – 2} right),$$ and $$log left( {{3^x} + 4} ri
If $$log 3log left( {{3^x} – 2} right),$$ and $$log left( {{3^x} + 4} right)$$ are in arithmetic progression, then x is equal to
If $${log _5}left( {{x^2} + x} right) – $$ $${log _5}left( {x + 1} right)$
If $${log _5}left( {{x^2} + x} right) – $$ $${log _5}left( {x + 1} right)$$ = 2, then the value of x is –
If $${log _{10}}a = p,$$ $${log _{10}}b = q,$$ then what is $${log _{10}}lef
If $${log _{10}}a = p,$$ $${log _{10}}b = q,$$ then what is $${log _{10}}left( {{a^p}{b^q}} right)$$ equal to?
$$frac{1}{2}left( {log x + log y} right)$$ will equal to $$log left( {fr
$$frac{1}{2}left( {log x + log y} right)$$ will equal to $$log left( {frac{{x + y}}{2}} right)$$ if –
If $$log frac{a}{b} + log frac{b}{a} = $$ $$,log left( {a + b} right),$$
If $$log frac{a}{b} + log frac{b}{a} = $$ $$,log left( {a + b} right),$$ then –
Determine the value of $${text{lo}}{{text{g}}_{3sqrt 2 }}left( {frac{1}{{18
Determine the value of $${text{lo}}{{text{g}}_{3sqrt 2 }}left( {frac{1}{{18}}} right)$$ is = ?
Which of the following statements is not correct?
Which of the following statements is not correct?
