Answer:
The Point in the first quadrant is [tex](\sqrt[2]{2.0268} ,6.559)[/tex].
Step-by-step explanation:
Since
we know the general equation of the circle whose center is at (h,k) and radius is r that is
[tex](x-h)^2+(y-k)^2 =r^2[/tex]
we have given center is (0,3) and radius is r= 4
substituting in the general equation of the circle we get
[tex]x^2 +(y-3)^2 = 16[/tex]
Now substituting the y= 2.5x + 3 in the above equation we get
[tex]x^2 +(2.5x + 3-3)^2 = 4^2[/tex]
[tex]x^2 +6.25x^2 = 16[/tex]
here subtracting 16 from both sides and also perform addition
we get
[tex]7.25x^2 = 16[/tex]
dividing both sides by 7.25 we get
[tex]x^2 =2.2068[/tex]
taking square root both sides we get
[tex]x= \frac{+}{-}\sqrt[2]{2.0268}[/tex]
but we need positive value of x because both x and y are positive in the first quadrant
that is
[tex]x= \sqrt[2]{2.0268}[/tex]
substituting this into the given equation of the line we get
y = 2.5([tex]\sqrt[2]{2.0268}[/tex])+3
y = 6.559
so the point in the first quadrant is ([tex]\sqrt[2]{2.0268}[/tex],6.559)
that is required
Answer:
The point at which the line y = 2.5·x + 3 intersect with the circle of radius 4 and center (0, 3) is x = 1.49
Step-by-step explanation:
Here we have the equation of a circle = (x - h)² + (y-k)² = r²
Where (h, k) is the coordinate of the center
Therefore, we have
(x - 0)² + (y - 3)² = 4²
Which gives x² + (y - 3)² = 16
Since the line y = 2.5·x + 3 we have
x² + ( (2.5·x + 3 ) - 3)² = 16
x² + (2.5·x)² = 16
x² + 6.25·x² = 16
7.25·x² = 16
x² = 16/7.25 = 2.21
x = 1.49
That is the line y = 2.5·x + 3 intersect with the circle of radius 4 and center (0, 3) at x = 1.49.
