Chord ED is parallel to the diameter AC of the circle. Given ∠CBE=55°, calculate ∠DEC.

$15^{\circ}$

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$25^{\circ}$

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$95^{\circ}$

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$35^{\circ}$

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Solution

The correct option is D
$35^{\circ}$

Consider the arc CDE.

The angles in the same segment are:

$∠ C B E a n d ∠ C A E$
$∴ ∠ C A E = ∠ C B E$
$\Rightarrow ∠ C A E = 55^{\circ} [∠ C B E = 55^{\circ}]$
Since AC is the diameter of the circle and the angle in a semi - circle is a right angle
Therefore,
$∠ A E C = 90^{\circ}$ .

Now, in $Δ A C E$ , we have
$∠ A C E + ∠ A E C + ∠ C A E = 180^{\circ}$
$\Rightarrow ∠ A C E + 90^{\circ} + 55^{\circ} = 180^{\circ}$
$\Rightarrow ∠ A C E = 35^{\circ}$ .

But $∠ D E C$ and $∠ A C E$ are alternate angles, because $A C | | D E$ .
$∴ ∠ D E C = ∠ A C E = 35^{\circ}$ .

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Similar questions

∠ C B E = 65^{\circ}

∠ D E C

Chord ED is parallel to the diameter AC of the circle. Given ∠CBE=55°, calculate ∠DEC.

E D

A C

∠ C B E = 65^{\circ}

∠ D E C

E D

A C

∠ C B E = 65^{\circ} c a l c u l a t e ∠ D E C .

In the given figure, chord ED is parallel to the diameter AC of the circle. If ∠CBE= 65°, then ∠DEC =

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