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Lines and Angles Ex-5.2

NCERT solutions for Maths Lines and Angles 

NCERT Solutions for Class 7 Maths Exercise 5.2

NCERT Solutions for Class 7 Maths Lines and Angles

Class –VII Mathematics (Ex. 5.2)
Question 1.State the property that is used in each of the following statements:

  1. If ab,a\parallel b, then \angle1 = \angle5.
  2. If \angle4 = \angle6, then ab.a\parallel b.
  3. If \angle4 + \angle5 + 180,180^\circ , then ab.a\parallel b.

Answer:

(i) Given, aba\parallel b then \angle1 = \angle5 [Corresponding angles]

If two parallel lines are cut by a transversal, each pair of corresponding angles are equal in measure.

(ii) Given, \angle4 = \angle6, then aba\parallel b [Alternate interior angles]

When a transversal cuts two lines such that pairs of alternate interior angles are equal, the lines have to be parallel.

(iii) Given, \angle4 + \angle5 = 180,180^\circ , then aba\parallel b [

When a transversal cuts two lines, such that pairs of interior angles on the same side of transversal are supplementary, the lines have to be parallel.


NCERT Solutions for Class 7 Maths Exercise 5.2

Question 2.In the adjoining figure, identify:

  1. the pairs of corresponding angles.
  2. the pairs of alternate interior angles.
  3. the pairs of interior angles on the same side of the transversal.
  4. the vertically opposite angles.

Answer:

(i) The pairs of corresponding angles:

\angle1, \angle5; \angle2, \angle6; \angle4, \angle8 and \angle3, \angle7

(ii) The pairs of alternate interior angles are:

\angle3, \angle5 and \angle2, \angle8

(iii) The pair of interior angles on the same side of the transversal:

\angle3, \angle8 and \angle2, \angle5

(iv) The vertically opposite angles are:

\angle1, \angle3; \angle2, \angle4; \angle6, \angle8 and \angle5, \angle7


NCERT Solutions for Class 7 Maths Exercise 5.2

Question 3.In the adjoining figure, pq.p\parallel q. Find the unknown angles.

Answer:

Given, pqp\parallel q and cut by a transversal line.

\because 125+e=180125^\circ + e = 180^\circ [Linear pair]

\therefore e=180125=55e = 180^\circ – 125^\circ = 55^\circ ……….(i)

Now e=f=55e = f = 55^\circ [Vertically opposite angles]

Also a=f=55a = f = 55^\circ [Alternate interior angles]

a+b=180a + b = 180^\circ [Linear pair]

\Rightarrow 55+b=18055^\circ + b = 180^\circ [From eq. (i)]

\Rightarrow b=18055=125b = 180^\circ – 55^\circ = 125^\circ

Now a=c=55a = c = 55^\circ and b=d=125b = d = 125^\circ [Vertically opposite angles]

Thus, a=55,b=125,c=55,d=125,e=55a = 55^\circ ,b = 125^\circ ,c = 55^\circ ,d = 125^\circ ,e = 55^\circ and f=55.f = 55^\circ .


NCERT Solutions for Class 7 Maths Exercise 5.2

Question 4.Find the values of xx in each of the following figures if lm.l\parallel m.

Answer:

(i) Given, lml\parallel m and tt is transversal line.

\therefore Interior vertically opposite angle between lines ll and t=110.t = 110^\circ .

\therefore 110+x=180110^\circ + x = 180^\circ [Supplementary angles]

\Rightarrow x=180110=70x = 180^\circ – 110^\circ = 70^\circ

(ii) Given, lml\parallel m and tt is transversal line.

x+2x=180x + 2x = 180 [Interior opposite angles]

\Rightarrow 3x=1803x = 180^\circ \Rightarrow x=1803=60x = \frac{{180^\circ }}{3} = 60^\circ

(iii) Given, lml\parallel m and aba\parallel b.

x=100x = 100^\circ [Corresponding angles]


NCERT Solutions for Class 7 Maths Exercise 5.2

Question 5.In the given figure, the arms of two angles are parallel. If ΔABC = 70,\Delta {\text{ABC = 70}}^\circ {\text{,}} then find:

(i) DGC

(ii) DEF

Answer:

(i) Given, AB \parallel DE and BC is a transversal line and ABC=70\angle {\text{ABC}} = 70^\circ

\because \angleABC = \angleDGC [Corresponding angles]

\therefore \angleDGC = 7070^\circ ……….(i)

(ii) Given, BC \parallel EF and DE is a transversal line and DGC=70\angle {\text{DGC}} = 70^\circ

\because \angleDGC = \angleDEF [Corresponding angles]

\therefore \angleDEF = 7070^\circ [From eq. (i)]


NCERT Solutions for Class 7 Maths Exercise 5.2

Question 6.In the given figures below, decide whether ll is parallel to m.m.

Answer:

(i) 126+44=170126^\circ + 44^\circ = 170^\circ

ll is not parallel to mm because sum of interior opposite angles should be 180.180^\circ .

(ii) 75+75=15075^\circ + 75^\circ = 150^\circ

ll is not parallel to mm because sum of angles does not obey the property of parallel lines.

(iii) 57+123=18057^\circ + 123^\circ = 180^\circ

ll is parallel to mm due to supplementary angles property of parallel lines.

(iv) 98+72=17098^\circ + 72^\circ = 170^\circ

ll is not parallel to mm because sum of angles does not obey the property of parallel lines.


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