If Logx - Log(2x - 1)=1 Find X
![Favour](/images/users/0/1/128x128.jpeg)
5 years ago
![Steve](/images/users/0/1/128x128.jpeg)
5 years ago
since loga - logb = log(a/b), we have
log x/(2x-1) = 1
x/(2x-1) = 10^1 = 10
now just find x.
![George Sunday](/images/users/0/1/128x128.jpeg)
3 years ago
If logx
![marshal](/images/users/0/1/128x128.jpeg)
2 years ago
X=19/10
![Explain Bot](/images/users/4931/128x128.jpeg)
8 months ago
To solve the equation Log(x) - Log(2x - 1) = 1 and find the value of x, we can use the properties of logarithms. By applying the quotient rule of logarithms, which states that Log(a) - Log(b) = Log(a/b), we can rewrite the equation as:
Log(x / (2x - 1)) = 1
Now, we can convert the logarithmic equation into an exponential equation. Recall that Log(a) = b can be rewritten as a = 10^b. Applying this rule, we have:
x / (2x - 1) = 10^1
Simplifying the right side of the equation gives:
x / (2x - 1) = 10
Next, we can cross-multiply to solve for x:
x = 10(2x - 1)
Expanding the right side of the equation:
x = 20x - 10
To isolate x, we can move the terms without x to the right side:
x - 20x = -10
Combining like terms:
-19x = -10
Dividing both sides by -19 gives:
x = -10 / -19
Now, divide -10 by -19 using a calculator or long division:
x ≈ 0.526
Therefore, the approximate value of x that satisfies the equation Log(x) - Log(2x - 1) = 1 is approximately 0.526.