Math, asked by deep732124, 3 months ago

Prove that only one tangent can be drawn to any point located on the circle.

plz guys don't answer wrong ..

Answers

Answered by FOXDON

Answer:

Theorem. At any point on a circle's circumference, one and only one tangent can be drawn to it, and this tangent is perpendicular to the radius through the point of contact. We will prove that L is a tangent to S. ... Thus, L intersects S in only one point (P), and hence L is a tangent to S

deep732124: bro it's not full answer

Answered by sanskriti726

Answer:

Hint: Only one tangent can be drawn to a circle from a point on the same circle, we will prove this by constructing a line perpendicular to the radius and will prove that all other points of the line lie exterior of the circle and hence touches the circle at a single point.

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