Stephanie has a recipe that calls for StartFraction 2 over 3 EndFraction tablespoons of vanilla to make 3 and StartFraction 1 over 2 EndFraction dozen cookies.

First, we need to find out how many tablespoons of vanilla are needed for one cookie.

To do this, we can divide the amount of vanilla needed to make 3 and 1/2 dozen cookies by the total number of cookies:

- 3 and 1/2 dozen cookies is the same as 3 x 12 + 1/2 x 12 = 42 cookies
- 2/3 tablespoons of vanilla is needed to make 3 and 1/2 dozen cookies
- Therefore, 2/3 ÷ 42 = 0.01587 tablespoons of vanilla is needed per cookie

To find out how many tablespoons of vanilla are needed per dozen cookies, we simply multiply the above amount by 12:

- 0.01587 x 12 = 0.19044, which we can round to 0.19 tablespoons of vanilla per dozen cookies

Therefore, Stephanie needs approximately 0.19 tablespoons of vanilla to make one dozen cookies.

So then what is 0.9 as a fraction? My options are: A.
StartFraction 1 over 21 EndFraction

B.
StartFraction 1 over 7 EndFraction

C.
StartFraction 4 over 21 EndFraction

D.
StartFraction 3 over 7 EndFraction

Option D is the correct answer.

To convert 0.9 to a fraction, we can write it as 9/10. Then, we can simplify the fraction by dividing both the numerator and denominator by their greatest common factor, which is 1:

- 9/10 ÷ 1/1 = 9/10
- Therefore, 0.9 as a fraction is StartFraction 9 over 10 EndFraction, which is equivalent to StartFraction 3 over 3 EndFraction x StartFraction 3 over 10 EndFraction, or StartFraction 3 over 7 EndFraction.