Write the sum of the two vectors as an ordered pair.

(6,-5) and (3,3)
A. (-,-2)
B. (6,1)
C. (1,6)
D. (-2,9)

Well, if we add the corresponding components of the two vectors, we get (6+3, -5+3). So the sum of the two vectors is (9, -2). That means the correct answer is A. (-,-2). Now who knew math could be so funny?

To find the sum of two vectors, we add the corresponding components together.

Given the vectors (6,-5) and (3,3), we can add their components as follows:

(6 + 3, -5 + 3)

This simplifies to:

(9, -2)

Therefore, the sum of the two vectors is the ordered pair (9, -2).

So, the correct answer is option A. (-2, 9).

To find the sum of two vectors, you need to add their corresponding components. In this case, you have two vectors: (6, -5) and (3, 3).

To get the sum of these vectors, add their corresponding x-components and y-components:

Sum of x-components: 6 + 3 = 9
Sum of y-components: -5 + 3 = -2

Therefore, the sum of the two vectors is (9, -2).

So, the correct answer is A. (-2, 9).

just add the respective elements: (6+3,-5+3) = (9,-2)

Looks like (A) without the typo