Math, asked by kavita1979chauhan, 7 months ago

In Figures 2a , find x, y and z.

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Answers

Answered by ay1261319126
4

Answer:

Hey you answer is here

Step-by-step explanation:

y = 60°

X= 50°

z = (180 - 35)°=145°

Answered by bhargavi0381
0

Answer:

ANSWER

Solution (i):

ABCD is a rectangle. We know that the diagonals of the rectangle are equal and bisect each other.

⟹BD=AC and AO=BO=OC=OD

In △ABO,

∠OAB=∠OBA=50

---Angles opposite to the equal sides in a triangle are equal.

In △AOB,

∠AOB+∠OAB+∠OBA=180

---sum of interior angles of a triangle

∴∠AOB=x=180

−50

−50

=80

Solution (ii):

ABCD is a rectangle. We know that the diagonals of the rectangle are equal and bisect each other.

⟹BD=AC and AO=BO=OC=OD

∠OCD+∠DCE=180

---Angles on a straight line

∠ODC=180

−146

=34

In △DOC,

∠ODC=∠OCD=34

---Angles opposite to the equal sides in a triangle are equal.

In △DOC,

∠CDO+∠DCO+∠DOC=180

---sum of interior angles of a triangle

∴∠DOC=180

−34

−34

=112

∠DOC=∠AOB=x=112

---Vertically Opposite angles

∠DCO=∠OAB=y=34

---Alternate angles

Solution (iii):

ABCD is a Square

∠ABC=∠BCD=∠CDA=∠DAB=90

---interior angles of a square are equal to 90

BCE is an equilateral triangle

∠EBC=∠BCE=∠BEC=60

∠ECD=∠BCD+∠BCE=90

+60

=150

In △CDE

CE=CD ⟹∠CED=∠CDE ---Angles opposite to the equal sides in a triangle are equal.

∠CDE+∠CED+∠DCE=180

---sum of interior angles of a triangle

2∠CED=180

−150

=30

∠CED=15

Therefore, ∠BEC=∠BED+∠CED

60

=x+15

x=60

−15

=45

Solution (iii):

BCE is an equilateral triangle

∠EBC=∠BCE=∠BEC=60

ABCD is a Square

∠ABC=∠BCD=∠CDA=∠DAB=90

---interior angles of a square are equal to 90

∠BCD=∠ECD+∠ECB=90

∠ECD=90

−60

=30

In △DEC,

CE=CD ⟹∠CED=∠CDE=y ---Angles opposite to the equal sides in a triangle are equal.

∠CDE+∠DCE+∠DEC=180

---sum of interior angles of a triangle

∴y+y=180

−30

=150

y=75

∠ADC=∠ADE+∠EDC=90

75

+x=90

x=15

y+z+∠CEB=360

---Central Angle measures 360

z=360

−75

−60

=225

Solution (iv):

∠ORS+∠SRT=180

---Angles on a straight line

∠ORS=180

−152

=28

y=90

---Diagonals of a Rhombus are orthogonal/perpendicular to each other

In △ORS,

∠OSR+∠SOR+∠ORS=180

---sum of interior angles of a triangle

∠OSR=180

−90

−28

=62

∠OSR=∠OQP=x=62

---Alternate angles

∠SRO=∠OPQ=28

---Alternate angles

z=∠OPQ=28

---Diagonal bisects the angle at vertices, in Rhombus

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