Explain how the vector C⃗(Going from the head of B⃗ to the head of A⃗) can be written in terms of vectors A⃗ and B⃗

Given the shape in this url:

imgur dot com/5nT3V

What is B+C=A mean?

I don't know, I think that it is A-B=C

To find the vector C⃗, which goes from the head of B⃗ to the head of A⃗, we can use the concept of vector subtraction.

In the given image, vector B⃗ is represented by the red arrow, and vector A⃗ is represented by the blue arrow. The head of B⃗ is the endpoint of the red arrow, and the head of A⃗ is the endpoint of the blue arrow.

To visually understand vector subtraction, imagine aligning the tail of B⃗ with the head of A⃗, so that they have a common starting point. The resulting vector, in this case, would be vector C⃗, going from the head of B⃗ to the head of A⃗.

Mathematically, vector subtraction is performed by subtracting the components of one vector from the components of the other vector. In this case, to find vector C⃗, we subtract the components of B⃗ from the corresponding components of A⃗.

C⃗ = A⃗ - B⃗

So, to write vector C⃗ in terms of vectors A⃗ and B⃗, you simply subtract the components of B⃗ from the corresponding components of A⃗.