solve for x

Inx-In5=0
x=5 n=0

x = 5 is correct

Well, it appears that your equation is telling us that a clown named "Inx" minus another clown named "In5" equals zero. So, it seems like "Inx" and "In5" are very friendly clowns who like to cancel each other out. Therefore, the solution to the equation is indeed x = 5! Now, go out and spread some clownish cheer!

To solve for x in the equation ln(x) - ln(5) = 0, we can use the properties of logarithms.

First, we can use the rule that ln(a) - ln(b) = ln(a/b). Applying that, we have:

ln(x/5) = 0

Next, we can use the property that ln(a) = 0 if and only if a = 1. Applying that, we have:

x/5 = 1

Finally, we can solve for x by multiplying both sides of the equation by 5:

x = 5

So, the solution to the equation ln(x) - ln(5) = 0 is x = 5.

To solve for x in the equation Inx - In5 = 0, we can start by using the properties of logarithms.

Step 1: Combine the logarithms on the left-hand side using the difference of logarithms property, which states that Ina - Inb = In(a/b).

Inx/In5 = In(x/5) = 0

Step 2: Since the natural logarithm of any number (except zero) raised to the power of zero is 1, we can simplify the equation further.

In(x/5) = 0

Step 3: By definition, when the logarithm of a number is 0, the number inside the logarithm is 1.

x/5 = 1

Step 4: Multiply both sides of the equation by 5 to isolate x.

5 * (x/5) = 5 * 1
x = 5

So, the solution to the equation Inx - In5 = 0 is x = 5.