Practice a Continued for Use With the Lesson Use Properties of Tangents

Tangent

The word "tangent" means "to touch". The Latin word for the same is "tangere". In general, we can say that the line that intersects the circle exactly at one point on its circumference and never enters the circle's interior is a tangent. A circle can have many tangents. They are perpendicular to the radius. Let us learn more about the tangent meaning and theorems in this article.

1. Tangent Meaning
2. Tangent of a Circle
3. Tangent Properties
4. Tangent Theorems
5. Tangent of Circle Formula
6. FAQs on Tangent

Tangent Meaning

In geometry, a tangent is the line drawn from an external point and passes through a point on the curve. One real-life example of a tangent is when you ride a bicycle, every point on the circumference of the wheel makes a tangent with the road. Let us understand the concept of a tangent with an example. The following figure shows an arc S and a point P external to S. A tangent from P has been drawn to S. This is an example of a representation of a tangent.

P is the tangent to the curve

Tangent Definition: Tangent in geometry is defined as a line that touches a curve or a curved surface at exactly one point.

Tangent of a Circle

A tangent of a circle is defined as a straight line that touches or intersects the circle at only one point. A tangent is a line that never enters the circle's interior. The following figure shows a circle with a point P. A tangent L passes through P has been drawn. This is an example of a tangent to circle.

Tangent of a circle

Point of Tangency

The point of tangency is defined as the only point of intersection where the straight line touches or intersects the circle. In the above figure, point P represents the point of tangency.

Tangent Properties

The tangent has two important properties:

  • A tangent touches a curve at only one point.
  • A tangent is a line that never enters the circle's interior.
  • The tangent touches the circle's radius at the point of tangency at a right angle.

Apart from the above-listed properties, a tangent to the circle has mathematical theorems associated with it and those theorems are used while doing major calculations in geometry. Let us discuss a few tangents to circle theorems in detail.

Tangent Theorems

There are two most important theorems on the tangent of a circle. Those are the tangent to radius theorem, and the two tangents theorem. Let us discuss their statements and proof in detail.

Tangent Radius Theorem: The tangent at any point of a circle is perpendicular to the radius through the point of contact.

Given: Tangent PL to a circle S (with the center of circle O), and the point of contact is A.

To prove: OA is perpendicular to the tangent PL.

Tangent radius theorem

Proof: Point P lies outside the circle. On joining PO we get PO > OA (radius of a circle). This condition will apply to every point on the line PL except point A.

PO > OA proves that OA is the shortest of all the distances of point O to the other points on PL.

Hence proved, OA is perpendicular to PL.

Two Tangents Theorem: Suppose that two tangents are drawn to a circle from an exterior point C. Let the points of contact be A and B, as shown in the image below.

two tangent theorem

The theorem states the following:

  • The lengths of these two tangents will be equal, that is, CA = CB.
  • The two tangents will subtend equal angles at the center, that is, ∠COA = ∠COB.
  • The angle between the tangents will be bisected by the line joining the exterior point and the center, that is, ∠ACO = ∠BCO.

Proof: All the three parts will be proved if we show that ΔCAO is congruent to ΔCBO. Comparing the two triangles, we see that:

  • OA = OB (radii of the same circle)
  • OC = OC (common side)
  • ∠OAC = ∠OBC = 90° (Tangent drawn to a circle is perpendicular to the radius at the point of tangency)
  • Thus, by the RHS criterion, ΔCAO is congruent to ΔCBO, and the truth of all the three assertions follows.

Tangent of Circle Formula

Let us now learn about the equation of the tangent. Tangent is a line and to write the equation of a line we need two things, slope (m) and a point on the line. General equation of the tangent to a circle:

1) The tangent to a circle equation x2 + y2 = a2 for a line y = mx +c is given by the equation y = mx ± a √[1+ m2].

2) The tangent to a circle equation x2+ y2 = a2 at (\(a_1, b_1)\) is x\(a_1\)+y\(b _1\)= a2

Thus, the equation of the tangent can be given as xa1+yb1 = a2, where (\(a_1, b_1)\) are the coordinates from which the tangent is made.

☛ Related Topics

Check these interesting articles related to the tangent and tangent to the circle.

  • Tangent Line Calculator
  • Tangent Line
  • Tangent Function

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FAQs on Tangent

What is the Meaning of Tangent?

The "tangent" is derived from the Latin word "tangere", which means "to touch". Tangent in geometry is defined as a line or plane that touches a curve or a curved surface at exactly one point on the boundary of the curve.

What is Tangent of a Circle?

A tangent is a line that never enters the circle's interior. Tangent to circle can be described as a straight line that passes through a point on a circle and is perpendicular to the radius. A tangent of the circle touches the circle at one point but does not enter the circle's interior.

What are the Two Major Theorems of Tangent to Circle?

The two major tangent to circle theorems are listed below:

  • The tangent at any point of a circle is perpendicular to the radius through the point of contact.
  • The lengths of the two tangents drawn from an external point to a circle are equal.

What is the Formula for Tangent of a Circle?

The general equation for tangent to circle can be expressed as:

  • The tangent to a circle equation x2 + y2 = a2 for a line y = mx +c is given by the equation y = mx ± a √[1+ m2].
  • The tangent to a circle equation x2+ y2 = a2 at (a1, b1) is xa1 +yb1 = a2.

Thus, the equation of the tangent can be given as xa1 + yb1 = a2, where (a1, b1) are the coordinates from which the tangent is drawn.

What are the Four Properties of Tangents to a Circle?

The four major properties of a tangent to a circle are listed as follows:

  • The tangent is a straight line that touches the circle at only one point.
  • It is perpendicular to the radius at the point of tangency.
  • It never enters the circle's interior.
  • The lengths of two tangents to a circle from the same external point are equal.

How Tangent is Important in Real Life?

It is necessary to study tangents because it allows us to find out the slope of a curved function at a specific point. It is easy to find the slope of a line, but to find out the slope in a curved function, a study of the tangent to a circle is a must. A tangent can be used for different applications such as:

  • In the differentials and approximations
  • Architecture
  • Engineering
  • Constructions

How do we Know if Two Circles are Tangent?

We know that a line is considered as a tangent to a circle if it touches the circle exactly at a single point. Similarly, one circle can be tangent to the other circle, if the circles are meeting or touching exactly at one point.

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Source: https://www.cuemath.com/geometry/tangent/

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