Answer:
ONE SOLUTION
Step-by-step explanation:
When two points on a line are given, the equation of the line is given by the formula:

where
and
are the points on the line.
Here, the first set of points are:
and
.
Therefore,
and
.
The line passing through this is given by:


∴ 2x + y - 1 =0
Now, for the second line, the points are:
and
.
Therefore, 

∴ 2x - y + 2 = 0
Now, to determine the number of solutions the two equations have, we solve these two equations,
Adding Eqn(1) and Eqn(2) we get:
4x = -1

And
.
Since, we arrive at unique values of 'x' and 'y', we say the lines have only one unique solution.
Answer:
The answer is B.x2/4y3n hope it helps
You need to put the graph up so if any on can help you
Answer:
y = (3 / (x-7)) - 5
Step-by-step explanation:
The original equation has the asymptotes at x = 0 and y = 0.
We want to translate to the right by 7 units so that the asymptote is at x = 7 and downwards 5 units so that the asymptote is y = -5.
Now, in the first case, to move it to the right, you must subtract 7 from the independent variable (i.e. x)
And in the second case, to move a function down 5 units, subtract 5 units from the entire function.
Applying the above, the new function would be:
y = (3 / (x-7)) - 5
Answer:
Step-by-step explanation:
(x - 18)/2 = -14
x - 18 = -28
x = -10
(y - 13)/2 = -18
y - 13 = -36
y = -23
(-10, -23) the other endpoint