Question

What is measure of angle z ? *

1. 60 degree
2. 120 degree
3. 180 degree
4. 30 degree​

Answer 1

Answer:Wherever you have the measures of angles mentioned, like, A, B, C, x, y, write them as A deg, x deg with the small circle on top right.

1) Sum of measures of angles in a triangle = 180 deg. One angle is a right angle, its measure = 90 deg. Measure of an acute angle is 35 deg.

  Measure of the other acute angle = 180 - 90 - 35 = 55 deg

2) Two angles of an Isosceles triangle are equal. Let the measure be A deg. The measure of the third angle is twice A = 2A.

     Sum of measures of all the angles is A+ A + 2 A = 180 deg

     So 4 A = 180        A = 180 / 4 = 45 deg

     So the triangle has two angles of measure 45 deg, and a third angle

      measuring 2 * 45 = 90 deg.

3 )

      measures of the three acute angles of the triangle are : x , x + 12, x - 12

       Sum = x + x + 12 + x - 12 = 3 x = 180 deg , as sum of measures is always

      180 deg in a triangle.

        3 x = 180 deg             x = 60 deg

          The measures of angles are 60 deg, 60 + 12 = 72 deg, 60 - 12 = 48 deg

4 )

  a)   measure of Exterior angle = sum of measures of Interior angles

          105 deg = y + 45 deg      So y = 105 - 45 = 60 deg

        sum of angles on one side of a straight line = 180 deg = x + 105

          So x = 180 - 105 = 75 deg

  b)  Angle x = angle 75 deg, as the included angles on the opposite side

        at A are equal.

        sum of measures of angles in triangle ABC = x + y + 40deg = 180

          75 + y + 40 = 180          y = 65 deg

  c)  At A, x = measure of angle BAC, or m BAC  = x

      At B  x = m ABC = x

      At C, x = m ACB  = x

      Sum of measures of angles in triangle ABC,  x + x  + x = 3 x  = 180 deg

      So x = 60 deg

 

      At B, x and y are supplementary angles, that is :  x + y = 180 deg

        So 60 + y = 180            y = 120 deg

5)

    The triangle ABC is a right angle triangle with right angle at C.  So C = 90.

    Sum of angles : x + 40 + 90 = 180          x = 50 deg.

    The angle ACB + ACD = 180   AS ACB = 90 deg.,  ACD = 90 deg

    Sum of measures of angles in triangle ACD:

          y + 60 + 90 = 180          So y = 30 deg

6)  In triangle ABC, the sum of measures of angles is 180 deg.

    So 40 + 30 + z = 180        z = 110 deg

   

    The lines XY || BC.  So, the included angles on the same side of AYC

    are same.    That is,  y = z  So y = 110 deg

    Similarly, the included angles on same side of AXB at X and B are same.

    That is  x = 30 deg

7)  The measures of angles are in ratio :  3:4:5  

    Let us say the measures are  3 x , 4 x and 5 x respectively.

    Sum of their measures is 180 deg.    So    3x + 4x+ 5x = 180 deg

        12 x = 180                x = 15 deg

    The angles are  45 deg, 60 deg, 75 deg.

    It is an acute angle triangle, as each of the measures is less than 90 deg.

8)    measures are in ratio:  1: 2: 6

      Let us sy measures are 1 x , 2 x , and 6x respectively.

      sum :  1x + 2 x + 6 x = 180 deg              So  9 x = 180 deg

      x = 20 deg

      the measures are :  20 deg, 40 deg, 120 deg.

      As one of the angles is an obtuse angle, it is an obtuse angle triangle.

Step-by-step explanation: