Statement 1: The incenter of a triangle ...

Statement 1: The incenter of a triangle formed by the lines `xcos(pi/9)+ysin(pi/9)=pi,xcos((8pi)/9)+ysin((8pi)/9)=pi` and `xcos((13pi)/9)+ysin((13pi)/9)=pi` is `(0,0)`
Statement 2: Any point equidistant from the given three non-concurrent straight lines in the plane is the incenter of the triangle formed by these lines.

Statement I is true ,statement II is true , statement II is a correct explanation for statement I

Statement I is true ,statement II is true statement II is not a correct explanation for statement I

Statement I is true ,statement II is false

Statement I is false ,statement II is true

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ARIHANT MATHS-THE STRAIGHT LINES-Exercise (Statement I And Ii Type Questions)

Statement I : The lines x(a+2b) +y(a+3b)=a+b are concurrent at the po...
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Statement I The points (3,2) and (1,4) lie on opposite side of the lin...
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Statement I If sum of algebraic distances from points A(1,2),B(2,3),C(...
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Statement I Let A-= (0,1) and B -= (2,0) and P be a point on the lin...
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Statement 1: The incenter of a triangle formed by the lines xcos(pi/...
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Statement I Reflection of the point (5,1) in the line x+y=0 is (-1,-5...
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Statement 1: The internal angle bisector of angle C of a triangle A B ...
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Statement 1:If the point (2a-5,a^2) is on the same side of the line x+...
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