5. if AOB is a diameter of the circle
and AC = BC, then angles CAB is equal to:
Answers
Answer:
The answer
Step-by-step explanation:
NOTE:-I will use D in place of B.
Angle subtended by a chord at the centre is double that of the angle subtended by chord on circumference.
Since diameter subtend 180° at centre therefore it subtend 90° at the circumference.
We can say that ∠ACD=90°
Since it given that AC=DC so the base angles are equal.
⇒∠CAD=∠CDA
In triangle ACD-
∠CAD+∠CDA+∠ACD=180°
Let ∠CAD=∠CDA=∅
therefore 2∅=90°
From this, we can conclude that-
∠CDA=∠CAD=45°
Answer:
We know that the angle at circumference subtended by the diameter of the circle is right angle.
Thus ∠ACB=90
In △ABC
AC=BC (given)
=>∠CAB=∠CBA
Now,
∠CAB+∠CBA+∠ACB=180
=>∠CAB+∠CAB=180−90
=>∠CAB= 90/2
=>∠CAB=45
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Step-by-step explanation: