Answer:
Step-by-step explanation:
The line is shown in the attachment.
The slope of this line is given by: 
The line passes through (0,1) and (1,5)
Plug in the points to get:
The equation of this line is given by 
, where b=1 is the y-intercept.
From the graph the y-intercept is 1, because the line intersects the y-axis at (0,1).
Therefore the equation is
You find the circumference and multiply it by the central angle. If the central angle is in degrees, you divide that by 360. If the central angle is in radians, you divide by 2pi.
<h3>I'll teach you how to solve 11X - X2 +4y2 = 52</h3>
-----------------------------------------------------------
11X - X2 +4y2 = 52
Add similar elements:
9x+4*2y= 52
Multiply the numbers 4*2:
4*2= 8
9x+8y= 52
Subtract 8y from both sides:
9x+8y-8y= 52- 8y
Simplify:
9x= 52- 8y
Divide both sides by 9:
9x/9= 52/9 - 8y/9
Simplify:
x= 
Your Answer Is 
Plz mark me as brainliest if this helped :)
The coordinates of the point X that lies along the directed line segment is (2, 4/3)
<h3>How to find the coordinates of the point X that lies along the directed line segment?</h3>
The points are given as:
A = (1, 1)
E = (7, 3)
The location 1/6 of the segment can be represented as;
m : n = 1 : 5
So, we have the coordinates of the point P that lies along the directed line segment to be
X = 1/6 * (mx2 + nx1, my2 + ny1)
So, we have:
X = 1/6 * (1 * 7 + 5 * 1, 1 * 3 + 5 * 1)
Evaluate
X = (2, 4/3)
Hence, the coordinates of the point X that lies along the directed line segment is (2, 4/3)
Read more about line partitions at:
brainly.com/question/17374569
#SPJ1
<u>Complete question</u>
Find the point X on line segment AE that is 1,6 of the distance from A (1,1) to E (7,3).
