You could find the x and y-intercepts by isolating these variables on one side. We’ll start by finding y.

15x+20y=1800

20y=1800-15x

y=(1800-15x)/20

Now, we insert this y into the original equation (substitution).

15x+20[(1800-15x)/2]=1800

Now we combine like terms and solve for x.

15x+(36000-300x/2)=1800

36000-300x/2=-15x+1800

36000-300x=-30x+3600

36000=270x+3600

32400=270x

x=120

So the x-intercept is 120. Now, we can either go through that long process again to find the y-intercept (which is really inefficient, and you probably won’t have time to do so on a test), or we can just input the x value we got into the original equation.

15x+20y=1800

15(120)+20y=1800

1800+20y=1800

20y=0

y=0

I’m not 100% sure about the y being 0, but I’m pretty sure. Hope this helped.