Raising a product or a quotient to a power
Simplify. Assume that no denominator is 0 and that 00 is not considered
├ ( (5a^7)/(2b^5 c)┤)^0
for any nonzero number, x^0 = 1
by the way, your brackets are not balanced.
Try using [ ] instead of those block graphics symbols. They're right there on your keyboard.
raise 10 to the 8th power, then find the quotient of the result and n
To simplify the expression ( (5a^7)/(2b^5 c) )^0, we need to understand the rule for raising a product or a quotient to a power.
The rule states that when you raise a product or a quotient to a power, you can distribute the power to each factor individually. In this case, the expression inside the parentheses is a quotient: (5a^7) / (2b^5 c).
To raise this quotient to the power of 0, we distribute the power of 0 to each factor. Anything raised to the power of 0 is always equal to 1. So, we can rewrite the expression as:
1^0
Now, any number or expression (except 0) raised to the power of 0 is always equal to 1. Therefore, the simplified expression is:
1
So, ( (5a^7)/(2b^5 c) )^0 simplifies to 1.