Answer:
Explanations:
For two vectors to be orthogonal, their dot product must be zero vector. Let the required vectors be (±x, ±y).
Using the expression;
[tex](4,9)\cdot(\pm x,\pm y)=(0,0)[/tex]
Take the dot product
[tex]4x+9y=0[/tex]
We now need to find suitable values of x and y satisfying this relationship (note we have one equation and two unknowns).
If x = 9
4(9) + 9y = 0
36 + 9y = 0
-9y =36
y = -4
Hence one of the vector will be (9, -4) and the other vector will be (-9, -(-4)) = (-9, 4)
