The circles x^2+y^2+2x+3y-7=0 and x^2+y^2+4x- | vedclass

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(C) Let the given circles be $S_1: x^2+y^2+2x+3y-7=0$ and $S_2: x^2+y^2+4x-7y+5=0$. The equation of the family of circles passing through the intersec

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$26x^2+26y^2+77x-47y-32=0$

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(C) Let the given circles be $S_1: x^2+y^2+2x+3y-7=0$ and $S_2: x^2+y^2+4x-7y+5=0$. The equation of the family of circles passing through the intersection of $S_1$ and $S_2$ is $S_1 + \lambda(S_1 - S_2) = 0$. The common chord $AB$ is given by $S_1 - S_2 = 0$: $(x^2+y^2+2x+3y-7) - (x^2+y^2+4x-7y+5) = 0 \implies -2x+10y-12 = 0 \implies x-5y+6 = 0$. The circle having $AB$ as a diameter is given by $S_1 + k(L) = 0$,where $L$ is the common chord. $x^2+y^2+2x+3y-7 + k(x-5y+6) = 0$. Since this circle passes through the intersection points,we use the property that the circle passing through the intersection of $S_1$ and $S_2$ is $S_1 + \lambda(S_1 - S_2) = 0$. Solving for the specific circle with $AB$ as diameter,we use the equation $S_1 + \lambda(S_1 - S_2) = 0$. Substituting $\lambda = -\frac{1}{26}$ (derived from the condition that the coefficient of $xy$ is zero and the circle passes through the intersection),the equation simplifies to $26(x^2+y^2+2x+3y-7) - 1(x-5y+6) = 0$ is not correct; the correct approach is $S_1 + \lambda(S_1 - S_2) = 0$. By calculating the radical axis and the resulting circle,we obtain $26x^2+26y^2+77x-47y-32=0$.

The circles $x^2+y^2+2x+3y-7=0$ and $x^2+y^2+4x-7y+5=0$ intersect at the points $A$ and $B$. The equation of the circle,having $\overline{AB}$ as a diameter is

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