Math, asked by DynamicNinja, 6 months ago

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In an acute △ABC, point H is the intersection point of altitude CE to AB and altitude BD to AC. A circle with DE as its diameter intersects AB and AC at F and G, respectively. FG and AH intersect at point K. If BC=25, BD=20, and BE=7, find the length of AKAK.

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Answered by Itzpurplecandy
7

Answer:

In an acute △ABC, point H is the intersection point of altitude CE to AB and altitude BD to AC. A circle with DE as its diameter intersects AB and AC at F and G, respectively. FG and AH intersect at point K. If BC=25, BD=20, and BE=7, find the length of AKAK.

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Answered by SweetCharm
1

 \huge \sf {\orange {\underline {\pink{\underline{Answer :-}}}}}

In an acute △ABC, point H is the intersection point of altitude CE to AB and altitude BD to AC. A circle with DE as its diameter intersects AB and AC at F and G, respectively. FG and AH intersect at point K. If BC=25, BD=20, and BE=7, find the length of AKAK.

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\red{\tt{sωєєтcнαям♡~}}

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