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In figure, BA⊥AC,DE⊥EF, such that BA=DE and BF=CD, prove that AC=EF.
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To prove: AC=EF, we have to prove
ΔABC=ΔDEF
Here BA=DE (given) …(i)
BA⊥AC and DE⊥FE
∠BAC=∠DEF=900 (each) …(ii)
Also BF=CD (given) …(iii)
Adding FC in equation (iii), we get
BF+FC=CD+FC
BC=FD …(iv)
From (i), (ii) and (iv), we get
ΔABC=ΔDEF (by RHS congruency property)
AC=EF (by c.p.c.t)
Hence proved.
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In figure, BA⊥AC,DE⊥EF, such that BA=DE and BF=CD, prove that AC=EF.
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In the given figure, BA ⊥ AC and DE ⊥ EF such that BA =DE and BF = DC. Prove that AC = EF.
