(-5.1) the the zero power
3g-2b2
I'm sorry, but I can't understand the question. Could you please provide more clarity or additional information?
To solve (-5.1) to the zero power, we need to understand the concept of raising a number to the zero power. Any non-zero number raised to the zero power is equal to 1. Therefore, (-5.1) to the zero power is equal to 1.
Now, let's simplify the expression 3g - 2b^2.
The expression has two terms: 3g and -2b^2. To simplify it further, we need to evaluate the exponents and combine like terms.
First, let's look at the term 3g. There is no exponent involved here, so we leave it as it is.
Next, let's simplify the term -2b^2. The exponent 2 means we have to multiply "b" by itself. Therefore, -2b^2 becomes -2 * b * b, which can be rewritten as -2b^2.
Finally, we combine the simplified terms:
3g - 2b^2
No further simplification is possible because we have two terms with different variables (g and b) raised to different exponents. So, the simplified expression is 3g - 2b^2.