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Question
Four alternative answers for the following question are given. Choose the correct alternative and write its alphabet:
A circle having radius 3 cm, then the length of its largest chord is ______.
Options
1.5 cm
3 cm
6 cm
9 cm
Solution
A circle having radius 3 cm, then the length of its largest chord is 6.
Explanation:
The largest chord of a circle is its diameter. The diameter is twice the radius of the circle.
Given that the radius of the circle is 3 cm, the diameter (largest chord) D would be:
D = 2 × radius
D = 2 × 3 cm
D = 6 cm
The length of the largest chord is 6 cm.
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RELATED QUESTIONS
Write the length of largest chord of a circle with radius 3.2 cm.
In the given figure, m(arc WY) = 44°, m(arc ZX) = 68°, then
(1) Find the measure of ∠ ZTX.
(2) If WT = 4.8, TX = 8.0,
YT = 6.4, find TZ.
(3) If WX = 25, YT = 8,
YZ = 26, find WT.
In the above figure, m(arc DXE) = 105°, m(Arc AYC) = 47°, then find the measure of ∠DBE.
Chords AB and CD of a circle intersect inside the circle at point E. If AE = 4, EB = 10, CE = 8, then find ED.
Given:
Chords AB and CD of a circle with centre P intersect at point E.
To prove:
AE × EB = CE × ED
Construction:
Draw seg AC and seg BD.
Fill in the blanks and complete the proof.
Proof:
In Δ CAE and Δ BDE,
∠AEC ≅ ∠DEB ...`square`
`square` ≅ ∠BDE ...(angles inscribed in the same arc)
∴ ΔCAE ~ ΔBDE ...`square`
∴ `square/ ("DE") = ("CE")/square` ...`square`
∴ AE × EB = CE × ED.
