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1
Solved example of logarithmic equations
$log\left(x+1\right)=log\left(x-1\right)+3$
2
Express the numbers in the equation as logarithms of base $10$
$\log \left(x+1\right)=\log \left(x-1\right)+\log \left(10^{3}\right)$
$\log \left(x+1\right)-\log \left(x-1\right)=\log \left(1000\right)$
4
The difference of two logarithms of equal base $b$ is equal to the logarithm of the quotient: $\log_b(x)-\log_b(y)=\log_b\left(\frac{x}{y}\right)$
$\log \left(\frac{x+1}{x-1}\right)=\log \left(1000\right)$
5
For two logarithms of the same base to be equal, their arguments must be equal. In other words, if $\log(a)=\log(b)$ then $a$ must equal $b$
$\frac{x+1}{x-1}=1000$
6
Multiply both sides of the equation by $x-1$
$x+1=1000\left(x-1\right)$
7
Solve the product $1000\left(x-1\right)$
$x+1=1000x-1000$
8
We need to isolate the dependent variable $x$, we can do that by subtracting $1$ from both sides of the equation
$x=-1001+1000x$
10
Eliminate the $-999$ from the left side, multiplying both sides of the equation by the inverse of $-999$
$x=1.002002$
Verify that the solutions obtained are valid in the initial equation
11
The valid solutions to the logarithmic equation are the ones that, when replaced in the original equation, don't result in any logarithm of negative numbers or zero, since in those cases the logarithm does not exist
$x=1.002002$
Final Answer
$x=1.002002$
In convert Exponentials and Logarithms we will mainly discuss how to change the logarithm expression to Exponential expression and conversely from Exponential expression to logarithm expression.
To discus about convert Exponentials and Logarithms we need to first recall about logarithm and exponents.
The logarithm of any number to a given base is the index of the power to which the base must be raised in order to equal the given number. Thus, if aˣ = N, x is called the logarithm of N to the base a.
For example:
1. Since 3⁴ = 81, the logarithm of 81 to base 3 is 4.
2. Since 10¹ = 10, 10² = 100, 10³ = 1000, ………….
The natural number 1, 2, 3, …… are respectively the logarithms of 10, 100, 1000, …… to base 10.
The logarithm of N to base a is usually written as log₀ N, so that the same meaning is expressed by the two equations
ax = N; x = loga N
Examples on convert Exponentials and Logarithms
1. Convert the following exponential form to logarithmic form:(i) 104 = 10000
Solution:
104 = 10000
⇒ log10 10000 = 4
(ii) 3-5 = x
Solution:
3-5 = x
⇒ log3 x = -5
(iii) (0.3)3 = 0.027
Solution:
(0.3)3 = 0.027
⇒ log0.3 0.027 = 3
2. Convert the following logarithmic form to exponential form:
(i) log3 81 = 4
Solution:
log3 81 = 4
⇒ 34 = 81, which is the required exponential form.
(ii) log8 32 = 5/3
Solution:
log8 32 = 5/3
⇒ 85/3 = 32
(iii) log10 0.1 = -1
Solution:
log10 0.1 = -1
⇒ 10-1 = 0.1.
3. By converting to exponential form, find the values of following:
(i) log2 16
Solution:
Let log2 16 = x
⇒ 2x = 16
⇒ 2x = 24
⇒ x = 4,
Therefore, log2 16 = 4.
(ii) log3 (1/3)
Solution:
Let log3 (1/3) = x
⇒ 3x = 1/3
⇒ 3x = 3-1
⇒ x = -1,
Therefore, log3(1/3) = -1.
(iii) log5 0.008
Solution:
Let log5 0.008 = x
⇒ 5x = 0.008
⇒ 5x = 1/125
⇒ 5x = 5-3
⇒ x = -3,
Therefore, log5 0.008 = -3.
4. Solve the following for x:
(i) logx 243 = -5
Solution:
logx 243 = -5
⇒ x-5 = 243
⇒ x-5 = 35
⇒ x-5 = (1/3)-5
⇒ x = 1/3.
(ii) log√5 x = 4
Solution:
log√5 x = 4
⇒ x = (√5)4
⇒ x = (51/2)4
⇒ x = 52
⇒ x = 25.
(iii) log√x 8 = 6
Solution:
log√x 8 = 6
⇒ (√x)6 = 8
⇒ (x1/2)6 = 23
⇒ x3 = 23
⇒ x = 2.
Logarithmic Form Vs. Exponential Form
The logarithm function with base a has domain all positive real numbers and is defined by
loga M = x ⇔ M = ax
where M > 0, a > 0, a ≠ 1
Logarithmic Form Exponential Formloga M = x ⇔ M = axLog7 49 = 2 ⇔ 72 = 49
● Write the exponential equation in logarithmic form.
Exponential Form Logarithmic FormM = ax ⇔ loga M = x
24 = 16 ⇔ log2 16 = 4
10-2 = 0.01 ⇔ log10 0.01 = -2
81/3 = 2 ⇔ log8 2 = 1/3
6-1 = 1/6 ⇔ log6 1/6 = -1
● Write the logarithmic equation in exponential form.
Logarithmic Form Exponential Formloga M = x ⇔ M = axlog2 64 = 6 ⇔ 26 = 64log4 32 = 5/2 ⇔ 45/2= 32log1/82 = -1/3 ⇔ (1/8)-1/3 = 2log3 81 = x ⇔ 3x = 81log5 x = -2 ⇔ 5-2 = xlog x = 3 ⇔ 103 = x
● Solve for x:
1. log5 x = 2
x = 52
= 25
2. log81 x = ½
x = 811/2
⇒ x= (92)1/2
⇒ x = 9
3. log9 x = -1/2
x = 9-1/2
⇒ x = (32)-1/2
⇒ x = 3-1
⇒ x= 1/3
4. log7 x = 0
x= 70
⇒ x = 1
● Solve for n:
1. log3 27 = n
3n = 27
⇒ 3n = 33
⇒ n = 3
2. log10 10,000 = n
10n = 10,000
⇒ 10n = 104
⇒ n = 4
3. log49 1/7 = n
49n = 1/7
⇒ (72)n = 7-1
⇒ 72n = 7-1
⇒ 2n = -1
⇒ n = -1/2
4. log36 216 = n
36n = 216
⇒ (62)n = 63
⇒ 62n= 63
⇒ 2n = 3
⇒ n = 3/2
● Solve for b:
1. logb 27 = 3
b3 = 27
⇒ b3 = 33
⇒ b = 3
2. logb 4 = 1/2
b1/2 = 4
⇒ (b1/2)2 = 42
⇒ b = 16
3. logb 8 = -3
b-3 = 8 ⇒ b-3 = 23
⇒ (b-1)3 = 23
⇒b-1 = 2
⇒ 1/b = 2
⇒ b = ½
4. logb 49 = 2
b2 = 49
⇒ b2 = 72
⇒ b = 7
● If f(x) = log3 x, find f(1).
Solution:
f(1) = log3 1 = 0 (since logarithm of 1 to any finite non-zero base is zero.)
Therefore f(1) = 0
● A number that is domain of the function y = log10 x is
(a) 1
(b) 0
(c) ½
(d) =10
Answer: (b)
● The graph of y = log4 x lines entirely in quadrants
(a) I and II
(b) II and III
(c) I and III
(d) I and IV
● At what point does the graph of y = log5 x intersect the x-axis?
(a) (1, 0)
(b) (0, 1)
(c) (5, 0)
(d) There is no point of intersection.
Answer: (a)
● Mathematics Logarithm
Mathematics Logarithms
Convert Exponentials and Logarithms
Logarithm Rules or Log Rules
Solved Problems on Logarithm
Common Logarithm and Natural Logarithm
Antilogarithm
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