which number is equivalent to 7^0
15 answers
Any number raised to the power of 0 is equal to 1. Therefore, 7^0 is equivalent to 1.
which number is equivalent to 9^-4
To evaluate 9^-4, we need to take the reciprocal of 9^4, which is (1/9^4) or 1/6561. Therefore, 9^-4 is equivalent to 1/6561.
which number is equivalent to 2^3/2^7
To simplify 2^3/2^7, we can subtract the exponents since the base is the same.
2^3/2^7 = 2^(3-7) = 2^-4
To evaluate 2^-4, we can take the reciprocal of 2^4.
2^-4 = 1/2^4 = 1/16
Therefore, 2^3/2^7 is equivalent to 1/16.
2^3/2^7 = 2^(3-7) = 2^-4
To evaluate 2^-4, we can take the reciprocal of 2^4.
2^-4 = 1/2^4 = 1/16
Therefore, 2^3/2^7 is equivalent to 1/16.
what is 11^0 as a positive exponent
Any non-zero number raised to the power of 0 is equal to 1. Therefore, 11^0, regardless of the exponent being positive or negative, is equal to 1.
what is 3^-5 as a positive exponent
To rewrite 3^-5 as a positive exponent, we can take its reciprocal and change the sign of the exponent:
3^-5 = 1/3^5
Therefore, 3^-5 as a positive exponent is equal to 1/3^5.
3^-5 = 1/3^5
Therefore, 3^-5 as a positive exponent is equal to 1/3^5.
rewrite the expression 4^-2 x 8^0 x 5^6 useing only postitive exponents
To rewrite the expression 4^-2 x 8^0 x 5^6 using only positive exponents, we need to convert any negative exponents to positive exponents.
Recall that any number raised to the power of 0 is equal to 1:
4^-2 x 8^0 x 5^6 = 1/4^2 x 8^0 x 5^6
Since 8^0 is already in a positive exponent form, we don't need to change it.
Finally, we can simplify to get the expression in terms of positive exponents:
1/4^2 x 8^0 x 5^6 = 1/16 x 1 x 5^6
Simplifying further:
1/16 x 1 x 5^6 = 1 x 5^6/16
The expression rewritten with only positive exponents is therefore 5^6/16.
Recall that any number raised to the power of 0 is equal to 1:
4^-2 x 8^0 x 5^6 = 1/4^2 x 8^0 x 5^6
Since 8^0 is already in a positive exponent form, we don't need to change it.
Finally, we can simplify to get the expression in terms of positive exponents:
1/4^2 x 8^0 x 5^6 = 1/16 x 1 x 5^6
Simplifying further:
1/16 x 1 x 5^6 = 1 x 5^6/16
The expression rewritten with only positive exponents is therefore 5^6/16.
it says its wrong
I apologize for the mistake. Let's correct the expression.
To rewrite 4^-2 x 8^0 x 5^6 using only positive exponents:
Recall that any number raised to the power of 0 is equal to 1:
4^-2 x 8^0 x 5^6 = 1/4^2 x 8^0 x 5^6
Since 8^0 equals 1, we can simplify further:
1/4^2 x 1 x 5^6 = 1/4^2 x 5^6
Simplifying, we have:
1/4^2 x 5^6 = 1/16 x 5^6
Now, let's write 5^6 with a positive exponent by recognizing that (a^b)^c = a^(b*c):
1/16 x 5^6 = 1/16 x (5^2)^3
Since 5^2 equals 25, we can rewrite the expression as:
1/16 x 25^3
Finally, we can simplify:
1/16 x 25^3 = 1/16 x 15625
The expression rewritten with only positive exponents is therefore 15625/16.
To rewrite 4^-2 x 8^0 x 5^6 using only positive exponents:
Recall that any number raised to the power of 0 is equal to 1:
4^-2 x 8^0 x 5^6 = 1/4^2 x 8^0 x 5^6
Since 8^0 equals 1, we can simplify further:
1/4^2 x 1 x 5^6 = 1/4^2 x 5^6
Simplifying, we have:
1/4^2 x 5^6 = 1/16 x 5^6
Now, let's write 5^6 with a positive exponent by recognizing that (a^b)^c = a^(b*c):
1/16 x 5^6 = 1/16 x (5^2)^3
Since 5^2 equals 25, we can rewrite the expression as:
1/16 x 25^3
Finally, we can simplify:
1/16 x 25^3 = 1/16 x 15625
The expression rewritten with only positive exponents is therefore 15625/16.
what is (5^-4)^2 as only postive exponents
To rewrite (5^-4)^2 using only positive exponents, we can simplify the inner exponent first.
Recall that raising a number to a power and then raising the result to another power is equivalent to raising the number to the product of the exponents.
Therefore, we can rewrite (5^-4)^2 as 5^(-4 * 2), which simplifies to 5^-8.
To write it with only positive exponents, we can take the reciprocal and change the sign of the exponent:
5^-8 = 1/5^8
Therefore, (5^-4)^2 as only positive exponents is equal to 1/5^8.
Recall that raising a number to a power and then raising the result to another power is equivalent to raising the number to the product of the exponents.
Therefore, we can rewrite (5^-4)^2 as 5^(-4 * 2), which simplifies to 5^-8.
To write it with only positive exponents, we can take the reciprocal and change the sign of the exponent:
5^-8 = 1/5^8
Therefore, (5^-4)^2 as only positive exponents is equal to 1/5^8.
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