What is the equation of the line with slope # m= -43/49 # that passes through # (19/7, 33/21) #?

1 Answer

#y = (-43/49)x + (1356/343)#

Explanation:

To find the equation of a line given the slope and a point of intersection, use the point-slope formula.

The point slope formula is written as: #y-y_1 = m(x-x_1)#. Substitute the given information into the formula by setting #y_1 = 33/21, x_1 = 19/7, and m = -43/49#.

You should get: #y - (33/21) = (-43/49)(x-(19/7))#.

Distribute the slope into #(x - 19/7)# and get: #y - (33/21) = (-43/49)x + (817/343)#.

Now solve for #y# by adding #33/21# to both sides to isolate the variable.

#y=-43/49x+817/343+33/21#

#y=-43/49x+817/343(3/3)+33/21(49/49)#

#y=-43/49x+2451/1029+1617/1029#

#y=-43/49x+4068/1029#

#y=-43/49x+(3/3)(1356/343)#

You should end up with #y = (-43/49)x + (1356/343)#.