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In Fig, line n is a transversal to line l and m. Identify the following:(i) Alternate and corresponding angles in Fig. (i)(ii) Angles alternate to ∠d and ∠g and angles corresponding to ∠f and ∠h in Fig. (ii)(iii) Angle alternate to ∠PQR, angle corresponding to ∠RQF and angle alternate to ∠PQE in Fig. (iii)(iv) Pairs of interior and exterior angles on the same side of the transversal in Fig.(ii) |
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Answer» (i) A pair of angles in which one arm of both the angles is on the same side of the transversal and their other arms are directed in the same sense is called a pair of corresponding angles. In Figure (i) Corresponding angles are ∠EGB and ∠GHD ∠HGB and ∠FHD ∠EGA and ∠GHC ∠AGH and ∠CHF A pair of angles in which one arm of each of the angle is on opposite sides of the transversal and whose other arms include the one segment is called a pair of alternate angles. The alternate angles are: ∠EGB and ∠CHF ∠HGB and ∠CHG ∠EGA and ∠FHD ∠AGH and ∠GHD (ii) In Figure (ii) The alternate angle to ∠d is ∠e. The alternate angle to ∠g is ∠b. The corresponding angle to ∠f is ∠c. The corresponding angle to ∠h is ∠a. (iii) In Figure (iii) Angle alternate to ∠PQR is ∠QRA. Angle corresponding to ∠RQF is ∠ARB. Angle alternate to ∠POE is ∠ARB. (iv) In Figure (ii) Pair of interior angles are ∠a is ∠e. ∠d is ∠f. Pair of exterior angles are ∠b is ∠h. ∠c is ∠g. |
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