6.08 Logarithms and indices

5^{2} = 25

3^{x} = 81

3^{1} = 3

2^{0} = 1

4.4^{0} = 1

25^{1.5} = 125

4^{\frac{5}{2}} = 32

4^{ - 2 } = 0.0625

4^{ - 3 } = \dfrac{1}{64}

x^{1.5} = 64

4^{m} = 9

5^{m} = q

w = h^{q}

\dfrac{1}{m^{ - j }} = n

10^{2} = 100

10^{ - 2 } = \dfrac{1}{100}

10^{\frac{1}{2}} = \sqrt{10}

10^{ - \frac{1}{2} } = \dfrac{1}{\sqrt{10}}

\log_{4} 16 = 2

\log_{5} 5 = 1

\log_{8} 1 = 0

\log_{2} 0.125 = - 3

\log_{3} \dfrac{1}{3} = - 1

\log_{5.8} 33.64 = 2

\log_{\frac{1}{3}} 9 = - 2

\log_{x} 32= 5

\log_{8} x = 6

\log_{g} 5 = 3

\log_{7} m = 40

\log_{y} k = u

\log_{r} p=y

\log_{10} 10\,000 = 4

\log_{10} \left(\sqrt{10}\right) = \dfrac{1}{2}

\log \left(\dfrac{1}{10\,000}\right) = - 4

\log \left(\dfrac{1}{\sqrt{10}}\right) = -\dfrac{1}{2}

Rewrite the equation in logarithmic form.

Find the value of x, correct to two decimal places.

10^{x} = 820

10^{x} = 0.0002

10^{x} = \dfrac{13}{50}

10^{x} = 14\,000

Express the number as a power of 10.

Hence state the base ten logarithm of the number.

1\,000\,000

0.000\,001

1

\dfrac{1}{10}

\log_{2} 64

\log_{2} \left(\dfrac{1}{2}\right)

\log_{5} 0.04

\log_{7} 1

\log_{1.1} 1.21

\log_{0.5} 4

\log_{\frac{1}{5}} 25

\log_{27} 3

\log_{2} \left(\dfrac{1}{16}\right)

Find the value of the following:

The logarithm, with any base, of what number is equal to zero?

Find \log_{10}10.

Find \log_{10}100.

Between which two consecutive integers would you expect \log_{10}90 to lie?

Between which two consecutive integers would you expect the logarithm to lie?

Find the value of the logarithm, correct to four decimal places.

\log_{10} 40

\log_{10} 7692

\log_{10} 0.005\,79

\log_{10} 8

\log_{3} 8

\log_{6} 20

\log_{0.5} 7

\log_{0.3} 15

- \log_{2} 23

5 \log_{4} 17

\log_{5} \left( 20^{2} \times \dfrac{3}{43}\right)

\log_{3} 6 + 2 \log_{3} 10 - 5 \log_{3} 15