Answer:
Point-Slope form: [tex]y+1=-\frac{6}{15}(x+5)\\[/tex]
standard form: [tex]2x+5y=-15[/tex]
Step-by-step explanation:
The standard form is given by: [tex]Ax+By=C[/tex]
The point-slope form is given by: [tex]y-y_1=m(x-x_1)[/tex]
point [tex](10,-7)[/tex] as point [tex](x_2,y_2)[/tex]
Let's find the slope:
[tex]m=\frac{-7-(-1)}{10-(-5)}=-\frac{6}{15}[/tex]
1. So, point slope form can be written as:
[tex]y-(-1)=-\frac{6}{15}(x-(-5))\\y+1=-\frac{6}{15}(x+5)\\[/tex]
2. Rearranging this equation and bringing all x's and y's to one side and the number to another side will give us the standard form. So:
[tex]y+1=-\frac{6}{15}x-2\\y+\frac{6}{15}x=-2-1\\y+\frac{6}{15}x=-3[/tex]
But A, B, and C (standard form) needs to be integers, so to get rid of the denominator , we multiply the whole equation by 15. So we have:
[tex]y+\frac{6}{15}x=-3\\15y+6x=-45[/tex]
We can factor out a 3, so it becomes:
[tex]15y+6x=-45\\5y+2x=-15[/tex]
So standard form is [tex]2x+5y=-15[/tex]
