PLZZ answer this friends: Area of the triangle formed by positive X-axis and the tangent and the normal at (1,root3) to the circle x^2+y^2=4??If anybody answer this with correct process then I surely mark as brainliest answer and give them 10 thanks
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Equation of circle is given,
e.g., x² + y² = 4
we know, equation of tangent of circle x² + y² = C at (x₁,y₁) is given by xx₁ + yy₁ = C
so, equation of tangent through (1,√3) is
x + √3y = 4 -------(1)
=> y = 4/√3 - x/√3 , it cuts the axis at (4,0)
now, equation of normal to the circle is
(y - √3)= slope of normal (x - 1)
[ we know, slope of normal × slope of tangent = -1 so, slope of normal = -1/(-1/√3) = √3 {slope of tangent is -1/√3 as shown equation (1) ]
now, equation of normal is
(y - √3) = √3(y - 1)
=> y - √3 = √3x - √3
=> y = √3x -----(2)
for clearance , you should see attachment,
area formed by tangent, normal and x axis is
hence, answer is 2√3 sq unit
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