If two adjacent angles of a parallelogram ABCD are (5x-10) and (x+10), then find the
ratio of these angles.
(3

Question

If two adjacent angles of a parallelogram ABCD are (5x-10) and (x+10), then find the ratio of these angles. (3​

Skylar · Answer

Step-by-step explanation:   The adjacent angles of parallelogram are supplementary  So the sum of adjacent angles = 180°  5x - 10 + x + 10 =180°                     6x  =180                       x  =180/6                       x  =30  5x-10 = 5(30) -10            = 150 -10            =140  x + 10 = 30 +10            =40  The ratio of these angles are given by                          140 : 40                            70 : 20                              7 :  2   I     HOPE     THIS     ANSWER     WILL     HELPS     YOU  .

Clara · Answer

Answer:   7:2 is the ratio   Step-by-step explanation:   As it is given adjacent angles,    (5x-10)+(x+10)=180 [in a parallelogram sum of adjacent angles=180]    6x=180    x=30 degrees    The angles are 5(30)-10,30+10    i.e. 140,40    Ratio is 140:40=7:2

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If two adjacent angles of a parallelogram ABCD are (5x-10) and (x+10), then find theratio of these angles.(3​