Of any two chords of a circle show that the one which is nearer to the centre is larger.

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Solution

Consider above the circle, Consider two chords $A B, C D$ .
at distance $a, b$ respectively $a > b$ .

let $A B = 2 l_{1}$

$C D = 2 l_{2}$

from the figure,
$a^{2} + l_{1}^{2} = r^{2} - - - (1)$
$a^{2} = r^{2} - l_{1}^{2} - - - - (2)$
$b^{2} + l_{2}^{2} = r^{2}$
$b^{2} = r^{2} - l_{2}^{2} - - - - - (3)$
$a^{2} > b^{2}$
$∴ r^{2} - l_{1}^{2} > r^{2} - l_{2}^{2}$
$∴ l_{2}^{2} > l_{1}^{2}$
$\Rightarrow l_{2} > l_{1}$
$\Rightarrow 2 l_{2} > 2 l_{1}$
$\Rightarrow C D > A B$
$\Rightarrow$ chord $A B$ is farther.
and chord $C D$ the nearer chord is longer. $[∴ b < a]$

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