Alternate Angles


 
 
Concept Explanation
 

Alternate Angles

Two angles, formed when a line crosses two other lines, that lie on opposite sides of the transversal line and on opposite relative sides of the other lines. If the two lines crossed are parallel, the alternate angles are equal.

Alternate interior angles: Alternate interior angles are the pair of angles lying in the region between the two lines (intersected by a transversal) and on the opposite sides of the transversal but one below the transversal and the other above the transversal. In the adjoining figure large (angle 4&angle 5) and (angle 3&angle 6) are pair of alternate interior angles.

Theorem: If a transversal intersects two parallel lines, then each pair of alternate interior angles is equal.

Given: m and n are parallel lines and the transversal l cuts m and n

To Prove : large angle 3 = angle 6 ;and; angle 4= angle 5

Proof: Corresponding angles are equal as m and n are parallel lines and l is the transversal

large angle 1 = angle 5 ;and; angle 2= angle 6;;;;;(1)   

Vertically opposite angles are equal when m and l intersect.

large angle 1 = angle 4 ;and; angle 2= angle 3 ;;; .......(2)

From Eq. (1) and (2)

large angle 5 = angle 4 ;and; angle 6= angle 3

Hence Proved that alternate interior angles are equal.

Theorem: If a transversal intersects two lines such that a pair of alternate interior angles is equal, then the lines are parallel.

Given : m and n are lines and the transversal l cuts m and n and angle 3 = angle 6

To Prove : m and n are parallel lines

Proof: Vertically opposite angles are equal when m and l intersect.

angle 2= angle 3 ;;; .......(1)

and angle 3 = angle 6;;;;.....(2)   

From Eq. (1) and (2)

angle 2 = angle 6

But they are Corresponding angles as m and n are lines and l is the transversal and as they are equal the lines are parallel.

Hence Proved that m and n are parallel lines.

Same is the case with exterior alternate angles

Alternate exterior angles: Alternate exterior angles are the pair of angles lying outside the region between the two lines (intersected by a transversal) and on the opposite sides of the transversal but one below the transversal and the other above the transversal. In the given figure (angle 1&angle 8) and (angle 2&angle 7) are pair of alternate exterior angles.

 

Illustration: Find the angle which is alternate to :angle 7,angle 6;and ;angle 1

Solution:

  • Angle alternate to angle 7 = angle 2, these are alternate exterior angles
  • Angle alternate to angle 6 = angle 3, these are alternate interior angles
  • Angle alternate to angle 1= angle 8, these are alternate exterior angles
  • Illustration:  In the given figure m || n and large angle 1:angle 2 = 5:3. Find the value of large angle 3 .

    Solution:    angle 1 : angle 2 = 5: 3

    Let the common factor be x

    angle 1 = 5x; and ; angle 2 = 3x

    angle 1 + angle 2 = 180^0 [ Linear; Pair]

    5x + 3x = 180^0

    8x = 180^0

    x = frac{180^0}{8} = frac{45^0}{2}

    angle 2 =3frac{45^0}{2}= frac{135^0}{2}

    angle 2 = angle 3; [ Alternate ;angle ]

    angle 3 = frac{135^0}{2}

    Illustration: In the given figure, PQ and RS are two mirrors placed parallel to each other . An incident ray AB strikes the mirror PQ at B, the reflected ray moves along the path and strikes the mirror RS at C and again reflects back along CD. Prove that AB || CD.

    Solution:

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    Sample Questions
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    Question : 1

    Find the alternate angle to e:

    Right Option : D
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    Explanation
    Question : 2

    If l || m,  then x will be  _________________

    Right Option : A
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    Explanation
    Question : 3

    Find the value of e:

    Right Option : C
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    Explanation
     
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