Unit 2 - 3 Logarithms

What is the relationship between the graph y=a^x and y = loga^x

The graph of the exponential function y=ax is a reflection of the logarithmic graph y=loga x in the line y=x. This tells us that y=ax and y=loga x are inverse functions.

What does 2^(2x+1) equal?

(4^x)*2

What kind of a number is the logarithm of a negative number?

A complex number

What is a logarithm to the base e called, and what is it abbreviated too?

A logarithm to the base e is called a natural logarithm and is abbreviated to ln

What point do all logarithmic graphs go through, and why?

All logarithmic graphs go through the point (1,0) because when x=1 we have y=log a (1) which is equivalent to a^y=1. Since any number raised to the power of 0 is 1, y=0 when x=1 for any value of a>0.

How would you find the solution to this equation 4^x −5× 2^x +4=0?

It is a disguised quadratic, so substitue y=x^2 into the equation. Factorise to solve for y, then put 2^x = y solutions, use logs to work out x.

What does log10 (x) equal?

Log (x)

If a^x = b, then how would you rewrite it using logs?

Log a (b) = x For a > 0

What is the multiplication law of logarithms?

Log a (x) + Log a (y) = Log a (xy)

When we see just log written, what does it mean?

Log10

How can you solve this equation: 10^x = 30?

Log10(30) = x =1.48

Does log a (x+y) = log a (x) + log a (y)?

No!

How would you solve the equation 43^x−1=3^x+2, giving your solution in the form log m/log n where m and n are rational numbers?

Taking logs on both sides since the solution is to be given in terms of logs to the base 10. Using the rule log a^x=x log a on both sides Multiplying out the bracket Collecting together terms containing x on the LHS Factorising the LHS so that xonly appears one in the equation Using the laws of logarithms to combine to a single log on each side of the equation

Why is there no logarithmic graphs for negative x values?

There is no logarithmic graph for negative values of x because the base a is always positive and when we raise a positive number to a power, the result is always positive.

What is the division rule of logarithms?

log a (x) - log a (y) = log a (x/y)

What is the power rule of logarithms?

log a (x^k) = k log a (x)

For 0<a<1, if x>1, y is...

negative

if 0<x<1 then y is...

negative

For base a>1, if x>1, then y is...

positive

if 0<x<1 then y is...

positive

What is equal to log a (1/x)?

-log a (x)

What does log a (1) equal?

0

What does log a (a) equal?

1

What must the base of a log always be?

A positive integer greater than 1

What is e?

Euler's number which is an irrational number like pi.

What does loge (x) equal?

ln (x)

How would you make x the subject of the equation logx^(y−1)=3

use logx^a = b which is x^b = a so x^3 = y-1. Or put x up to the power of the equation on both sides to cancel the logs because x^logx^a = a

What does a^ loga^x equal?

x

What does e^lnx equal?

x

What does ln(e^x) equal?

x

What does loga (a^x) equal?

x