Find the equation of the tangents through (7,1) to the circle `x^2+y^2=25`A. `3x+4y-25=0, 4x-3y-25=0`B. `4x+3y-31=0, 3x-4y-17=0`C. `3x-2y-19=0, 2x+3y-17=0`D. none of these

Find the equation of the tangents through (7,1) to the circle `x^2+y^2

1.	Find the equation of the tangents through (7,1) to the circle `x^2+y^2=25`A. `3x+4y-25=0, 4x-3y-25=0`B. `4x+3y-31=0, 3x-4y-17=0`C. `3x-2y-19=0, 2x+3y-17=0`D. none of these
Answer» Correct Answer - A The equation of any line through (7, 1) is `y-1=m(x-7)rArrmx-y-7m+1=0 " " ...(i)` The coordinates of the centre and radius of the given circle are (0, 0) and 5 respectively. The line (i) will touch the given circle, if, Length of the perpendicular from the centre = Radius `rArr \|(mxx0-0-7m+1)/(sqrt(m^(2)+(-1)^(2)))\|=5` `rArr \|(1-7m)/(sqrt(m^(2))+1)\|=5` `rArr ((1-7m)^(2))/(m^(2)+1)=25rArr 24m^(2)-14m-24=0rArr m=-3//4, 4//3` Substituting the values of m in (i), we obtain `-(3)/(4)x-y+(21)/(4)+1=0` and `(4)/(3)x-y-(28)/(3)+1=0` `rArr 3x+4y-25=0` and `4x-3y-25=0` which are the equations of tangents.

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Find the equation of the tangents through (7,1) to the circle `x^2+y^2=25`A. `3x+4y-25=0, 4x-3y-25=0`B. `4x+3y-31=0, 3x-4y-17=0`C. `3x-2y-19=0, 2x+3y-17=0`D. none of these

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