Example 5
Given that ${\log }_{2}3=1.585$   and ${\log }_{2}5=2.322$  , evaluate the following.
(a) ${\log }_{8}15$
(b) ${\log }_{5}0.6$
(c) ${\log }_{15}30$
(d) ${\log }_{16}45$

Solution:

Example 1
Find the value of each of the following :
(a) ${\log }_{2}64$
(b) ${\log }_{3}1$
(c) ${\log }_{5}5$
(d) ${\log }_{\frac{1}{2}}4$
(e) ${\log }_{8}0.25$

Example 2
Solve the following equations:
(a) ${\log }_{3}5x=2$
(b) ${\log }_{x+1}81=2$
(c) ${\log }_{x}5x-6=2$

Question 15 (4 marks):
$\begin{array}{l}\left(\text{a}\right)\text{ Given }P={\log }_{a}Q\text{, state the }\\ \text{conditions of }a\text{.}\\ \left(\text{b}\right)\text{ Given }{\log }_{3}y=\frac{2}{{\log }_{xy}3}\text{, express }\\ y\text{ in terms of }x\text{.}\end{array}$

Solution:
(a)
a > 0, a ≠ 1

(b)
$\begin{array}{l}{\log }_{3}y=\frac{2}{{\log }_{xy}3}\\ \frac{{\log }_{xy}y}{{\log }_{xy}3}=\frac{2}{{\log }_{xy}3}\\ {\log }_{xy}y=2\\ y={\left(xy\right)}^2\\ y=x^2{y}^2\\ \frac{1}{x^2}=\frac{y^2}{y}\\ y=\frac{1}{x^2}\end{array}$

Question 16 (3 marks):
$\text{Given }\frac{{25}^{h+3}}{{125}^{p-1}}\text{=1, express }p\text{ in terms of }h\text{.}$

Solution:
$\begin{array}{l}\frac{{25}^{h+3}}{{125}^{p-1}}=1\\ {25}^{h+3}={125}^{p-1}\\ {\left(5^2\right)}^{h+3}={\left(5^3\right)}^{p-1}\\ 5^{2h+6}=5^{3p-3}\\ 2h+6=3p-3\\ 3p=2h+9\\ p=\frac{2h+9}{3}\end{array}$

Question 17 (3 marks):
$\begin{array}{l}\text{Solve the equation:}\\ {\log }_{m}324-{\log }_{\sqrt{m}}2m=2\end{array}$

Solution:
$\begin{array}{l}{\log }_{m}324-{\log }_{\sqrt{m}}2m=2\\ {\log }_{m}324-\frac{{\log }_{m}2m}{{\log }_m{m}^{\frac{1}{2}}}=2\\ {\log }_{m}324-2\left(\frac{{\log }_{m}2m}{{\log }_{m}m}\right)=2\\ {\log }_{m}324-2{\log }_{m}2m=2\\ {\log }_{m}324-{\log }_m{\left(2m\right)}^2=lo{g}_m{m}^2\\ {\log }_m\left(\frac{324}{4m^2}\right)=lo{g}_m{m}^2\\ \frac{324}{4m^2}=m^2\\ 4m^4=324\\ m^4=81\\ m=\pm 3\left(-3\text{ is rejected}\right)\end{array}$