Respuesta :
Answer:
So the coordinates are [tex] (1+ \sqrt{31}, 1-\sqrt{31}),(1-\sqrt{31} , 1+\sqrt{31})[/tex]
Step-by-step explanation:
For this case we assume that the line is given by this formula [tex] y = 2-x[/tex]
We know that the general equation for a circle is given by:
[tex] (x-h)^2 +(y-k)^2 = r^2 [/tex]
Since the circle for this case is centered at the origin then h,k =0 and we have this:
[tex] x^2 + y^2 = 8^2 = 64 [/tex] (1)
For this case we can replace the formula for y from the line into equation (1) and we got:
[tex] x^2 + (2-x)^2= 64[/tex]
We know from algebra that [tex] (a-b)^2 = a^2 -2ab +b^2[/tex] if we use this concept we got:
[tex] x^2 +4 -4x + x^2 = 64[/tex]
We can subtract 64 on both sides and we got:
[tex] 2x^2 -4x -60 =0[/tex]
Now we can divide both sides by 2 and we got:
[tex] x^2 -2x -30 = 0[/tex]
And we can use the quadratic formula to solve this:
[tex] x = \frac{-b \pm \sqrt{b^2 -4ac}}{2a}[/tex]
For this case [tex] a=1, b=-2 , c=-30[/tex] and if we replace we got:
[tex] x = \frac{2 \pm \sqrt{2-4*(1)*(-30)}}{2}[/tex]
And we got [tex] x_1= 1+\sqrt{31} , x_2 = 1-\sqrt{31}[/tex]
Now we just need to replace into the original equation for the line and we get the y coordinates like this:
[tex] y_1 = 2- (1+\sqrt{31}) =1-\sqrt{31}[/tex]
[tex] y_2 = 2- (1-\sqrt{31}) =1+\sqrt{31}[/tex]
So the coordinates are [tex] (1+ \sqrt{31}, 1-\sqrt{31}),(1-\sqrt{31} , 1+\sqrt{31})[/tex]
