Advertisements
Advertisements
प्रश्न
AP and BQ are the bisectors of the two alternate interior angles formed by the intersection of a transversal t with parallel lines l and m (Figure). Show that AP || BQ.
उत्तर
Given In the figure l || m, AP and BQ are the bisectors of ∠EAB and ∠ABH, respectively.
To prove AP || BQ
Proof Since, l || m and t is transversal.
Therefore, ∠EAB = ∠ABH ...[Alternate interior angles]
`1/2 ∠EAB = 1/2 ∠ABH` ...[Dividing both sides by 2]
∠PAB = ∠ABQ ...[AP and BQ are the bisectors of ∠EAB and ∠ABH]
Since, ∠PAB and ∠ABQ are alternate interior angles with two lines AP and BQ and transversal AB.
Hence, AP || BQ.
APPEARS IN
संबंधित प्रश्न
In the below fig, AB || CD || EF and GH || KL. Find `∠`HKL
In the given figure, if AB || CD, then the value of x is
In the given figure, PQ || RS, ∠AEF = 95°, ∠BHS = 110° and ∠ABC = x°. Then the value of x is
In the given figure, if lines l and m are parallel, then x =
In the given figure, if AB || CD, then x =
In the given figure, if lines l and m are parallel lines, then x =
In the given figure, if l || m, then x =
In the given figure, If line segment AB is parallel to the line segment CD, what is the value of y?
In the following figure, if OP || RS, ∠OPQ = 110° and ∠QRS = 130°, then ∠PQR is equal to ______.
In the following figure, BA || ED and BC || EF. Show that ∠ABC + ∠DEF = 180°
