Start with $DeltaOAU$ , with $bar(OA) = a$ , extend $bar(OU)$ in such a way that $bar(UB) = b$ , with $B$ on $bar(OU)$ . Construct a parallel line to $bar(UA)$ intersecting $bar(OA)$ at C. Show that, $bar(AC) = ab$ ?

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Start with $DeltaOAU$ , with $bar(OA) = a$ , extend $bar(OU)$ in such a way that $bar(UB) = b$ , with $B$ on $bar(OU)$ . Construct a parallel line to $bar(UA)$ intersecting $bar(OA)$ at C. Show that, $bar(AC) = ab$ ?

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Answer 1 · 2018-04-23T03:26:52

see explanation.

Explanation:

enter image source here
Draw a line $UD$ , parallel to $AC$ , as shown in the figure.
$=> UD=AC$
$DeltaOAU and DeltaUDB$ are similar,
$=> (UD)/(UB)=(OA)/(OU)$
$=> (UD)/b=a/1$
$=> UD=ab$
$=> AC=ab " (proved)"$

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Start with $DeltaOAU$ , with $bar(OA) = a$ , extend $bar(OU)$ in such a way that $bar(UB) = b$ , with $B$ on $bar(OU)$ . Construct a parallel line to $bar(UA)$ intersecting $bar(OA)$ at C. Show that, $bar(AC) = ab$ ?

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Start with DeltaOAUDeltaOAU, with bar(OA) = abar(OA) = a , extend bar(OU)bar(OU) in such a way that bar(UB) = bbar(UB) = b, with BB on bar(OU)bar(OU). Construct a parallel line to bar(UA)bar(UA) intersecting bar(OA)bar(OA) at C. Show that, bar(AC) = abbar(AC) = ab?

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Start with $DeltaOAU$ , with $bar(OA) = a$ , extend $bar(OU)$ in such a way that $bar(UB) = b$ , with $B$ on $bar(OU)$ . Construct a parallel line to $bar(UA)$ intersecting $bar(OA)$ at C. Show that, $bar(AC) = ab$ ?