ms.sue help asap

1. which exponent makes the statement true? 1/5^9 =5^?
9
-9
1/9
-1/9
2. y^5*y^14 =
2y^19
y^60
y^19
2y^60
3. w^12/w^18
w^30
w^-30
w^6
w^-6
4. using the numbers 3,2, and 4 which of these problems would have a solution of 4?
4*2^3/2^3
2*2^3/2^4
3*2^3/2^4
3*2^4/2^4

5. taylor completed the problem below. describe and correct the error in the problem.
2^-4 = -2*-2*-2*-2=16
a ) taylor changed the negative exponent to a negative base. the problem should be 2^-4= 1/2^4=1/2*2*2*2*2=1/16
b) taylor did not multiply correctly the answer shoudl be 16.
c) taylor made the answer positive it should be -16
d) taylor did not multiply by -1 the problem should be 2^-4=(-1) 1/2^4=(-1)1/2*2*2*2=1/16

i think these are the answers please check them ms.sue

1.b
2.c
3.d
4.a
5.a i am not sure about number 5

dont worry i got 100 already

5. is A

I got a 60 the last 2 aren’t right but thanks for trying to help anyway

I don't know. Sorry.

Yay! Congratulations!

thanks

i promise

1. To find the exponent that makes the equation 1/5^9 = 5^?, we can simplify the expression. First, we know that any number raised to the power of 0 is 1, so let's write 5^0 = 1.

Next, we need to find a common base for both fractions. We can rewrite 1/5^9 as 5^0/5^9.

To divide two exponents with the same base, we subtract the exponents. In this case, 0 - 9 = -9. So, the answer is 5^-9.

Therefore, the correct exponent that makes the equation true is -9.

2. To simplify the expression y^5 * y^14, we need to apply the exponent rule for multiplying two exponents with the same base.

The rule states that when multiplying two exponents with the same base, you add their exponents. So, in this case, we add 5 and 14 together.

y^5 * y^14 = y^(5 + 14)
y^5 * y^14 = y^19

Therefore, the simplified expression is y^19.

3. To simplify the expression w^12/w^18, we need to apply the exponent rule for dividing two exponents with the same base.

The rule states that when dividing two exponents with the same base, you subtract their exponents. So, in this case, we subtract 18 from 12.

w^12/w^18 = w^(12 - 18)
w^12/w^18 = w^(-6)

Therefore, the simplified expression is w^(-6) (or 1/w^6).

4. To find which of the given problems has a solution of 4 using the numbers 3, 2, and 4, we need to evaluate each expression.

a) 4 * 2^3 / 2^3 = 4 * 8 / 8 = 4

Therefore, the problem 4 * 2^3 / 2^3 has a solution of 4.

5. Taylor's error lies in the simplification of the problem.

The correct answer is option (a): Taylor changed the negative exponent to a negative base. The problem should be written as 2^-4 = 1/2^4 = 1/(2 * 2 * 2 * 2) = 1/16.

Taylor initially misunderstood the concept of negative exponents and incorrectly converted it to a negative base rather than calculating the reciprocal.

Therefore, the correct and simplified answer is 1/16.

i don't lie and I'm here to help people i promise from the bottom of my heart the anwsers are

1-b
2-c
3-d
4-b
5-c

i promise this are the right answers i got 3/5 with kathy's anwers so i hope this helps every one thank you!