Consider the given equations,
y=0 .....(I)
y=x .....(II)
2x+3y=10 .......(III)
Consider the diagram,
The vertex A from equation (I) and (III) is (5,0).
The vertex B from equation (I) and (II) is (0,0).
The vertex C from equation (II) and (III) is (2,2).
Let the equation of circle be,
x2+y2+2gx+2fy+c=0 ....(IV)
The equation (IV) passes through point
B(0,0)‌so,C=0 since, equation (IV) passes through
A(5,0) so,
25+0+10g+0+0=0 g=− The equation (IV) passes through
C(2,2) so,
4+4+4g+4f=0 g+f+2=0 −+f+2=0 f= Therefore, the center of circle is
(−g,−f)=(,)