Find the numerical equivalent of 4 ^ 9 * 4 ^ - 7 * (tpoint); 4 ^ 16; 4 ^ 2 16 <
To simplify the expression, let's break it down step by step:
First, let's simplify 4 ^ 9 * 4 ^ -7:
When we have the same base raised to different exponents, we can simply add the exponents. In this case, since 4 is the base, we have:
4 ^ 9 * 4 ^ -7 = 4^(9 + (-7)) = 4^2
Now, let's calculate 4^2 and substitute it back into the expression:
4^2 = 16
So, the expression becomes:
16 * (tpoint); 4 ^ 16
Here, we need more information about "(tpoint)" in order to simplify the expression further.
To simplify the expression, let's break it down step-by-step:
Step 1: Simplify the exponents of 4
First, we can simplify the base number 4 by adding the exponents together.
4^9 * 4^-7 = 4^(9 + (-7))
Step 2: Simplify the exponents further
The sum of 9 and -7 is 2. Therefore, we have:
4^(9 + (-7)) = 4^2
Step 3: Calculate the final exponent
4^2 can be calculated as:
4^2 = 4 * 4 = 16
So, the numerical equivalent of the expression 4^9 * 4^-7 is 16.
After that, the expression simplifies to:
16 * (tpoint) * 4^16 * 4^2
However, it's not clear what you meant by "(tpoint)." Could you please clarify?
To find the numerical equivalent of the given expression, let's break it down step by step:
1. Start with 4 raised to the power of 9: 4^9 = 262,144.
2. Multiply the result by 4 raised to the power of -7: 262,144 * 4^-7 = 262,144 * (1 / 4^7) = 262,144 * (1 / 16,384) = 16.
3. Next, we have a multiplication by (tpoint). The value of (tpoint) is not provided in your question, so we cannot determine the numerical equivalent without knowing its value.
4. Finally, we have 4 raised to the power of 16: 4^16 = 4,294,967,296.
Therefore, the numerical equivalent of the expression depends on the value of (tpoint). If you provide the value of (tpoint), I can assist you in calculating the final result.