Answer:
[tex] \boxed{\rm \: Slope = 3/7 \: x}[/tex]
Step-by-step explanation:
Given :
To Find:
Solution:
Well,to find out the slope of the line here, we'll need to re-write the fully solved equation into slope - intercept form.
[tex] \boxed{ \rm \: y = mx = b}[/tex]
Here,
- m = slope
- b = y - intercept.
[Add 3x to both sides to the original equation:]
- [tex] \rm \: 7y = - 15 + 3x[/tex]
Divide each term in this equation by 7:
- [tex] \cfrac{7y}{7} = \cfrac{ - 15}{7} + \cfrac{3x}{7} [/tex]
- [tex] \rm \: y = \cfrac{ - 15}{7} + \cfrac{3x}{7} [/tex]
Now rewrite this equation into slope-intercept form.
Plug values.
- [tex]y = \cfrac{3x}{7} - \cfrac{15}{7} = \cfrac{3}{7} x - \cfrac{15}{7} [/tex]
- > So , y - intercept is 15/7
- > Slope m is 3/7 x.
Hence,we can conclude:
- The slope of the line parallel to -3x+7y=-15 is 3/7 x.
[tex] \rule{225pt}{2pt}[/tex]
