find the base n 24n+25n=52n
Starting with 24n + 25n = 52n, we can simplify by combining like terms on the left-hand side:
49n = 52n
Next, we can isolate n on one side of the equation by subtracting 49n from both sides:
0 = 3n
This tells us that n must be 0, since no other value of n would make the equation true. Therefore, the base n in this equation is 0.
To find the base, n, in the equation 24n + 25n = 52n, we can start by simplifying the equation.
First, let's combine like terms on both sides of the equation:
24n + 25n = 52n
(24 + 25)n = 52n
49n = 52n
Now, we can isolate the variable n on one side of the equation. Let's subtract 52n from both sides:
49n - 52n = 52n - 52n
-3n = 0
Next, we can divide both sides of the equation by -3:
(-3n) / -3 = 0 / -3
n = 0
Therefore, the base, n, in the equation 24n + 25n = 52n is equal to 0.