Q => In the given figure, altitudes AD and CE of ∆ ABC intersect eac

1.	Q => In the given figure, altitudes AD and CE of ∆ ABC intersect each other at the point P. Show that:(i) ∆AEP ~ ∆ CDP(ii) ∆ABD ~ ∆ CBE(iii) ∆AEP ~ ∆ADB(iv) ∆ PDC ~ ∆ BEC
Answer» *HERE* IS YOUR ANSWER MATE.....; Given that AD and CE are the altitudes of TRIANGLE ABC and these altitudes intersect each other at P. (i) In ΔAEP and ΔCDP, ∠AEP = ∠CDP (90° each) ∠APE = ∠CPD (VERTICALLY opposite angles) Hence, by AA similarity criterion, ΔAEP ~ ΔCDP (ii) In ΔABD and ΔCBE, ∠ADB = ∠CEB ( 90° each) ∠ABD = ∠CBE (Common Angles) Hence, by AA similarity criterion, ΔABD ~ ΔCBE (iii) In ΔAEP and ΔADB, ∠AEP = ∠ADB (90° each) ∠PAE = ∠DAB (Common Angles) Hence, by AA similarity criterion, ΔAEP ~ ΔADB (IV) In ΔPDC and ΔBEC, ∠PDC = ∠BEC (90° each) ∠PCD = ∠BCE (Common angles) Hence, by AA similarity criterion, ΔPDC ~ ΔBEC Hope It's Helpful....:) @ItzPyscho17

Q => In the given figure, altitudes AD and CE of ∆ ABC intersect each other at the point P. Show that:(i) ∆AEP ~ ∆ CDP(ii) ∆ABD ~ ∆ CBE(iii) ∆AEP ~ ∆ADB(iv) ∆ PDC ~ ∆ BEC

Answer»

HERE IS YOUR ANSWER MATE.....;

Given that AD and CE are the altitudes of TRIANGLE ABC and these altitudes intersect each other at P.

(i) In ΔAEP and ΔCDP,

∠AEP = ∠CDP (90° each)

∠APE = ∠CPD (VERTICALLY opposite angles)

Hence, by AA similarity criterion,

ΔAEP ~ ΔCDP

(ii) In ΔABD and ΔCBE,

∠ADB = ∠CEB ( 90° each)

∠ABD = ∠CBE (Common Angles)

Hence, by AA similarity criterion,

ΔABD ~ ΔCBE

(iii) In ΔAEP and ΔADB,

∠AEP = ∠ADB (90° each)

∠PAE = ∠DAB (Common Angles)

Hence, by AA similarity criterion,

ΔAEP ~ ΔADB

(IV) In ΔPDC and ΔBEC,

∠PDC = ∠BEC (90° each)

∠PCD = ∠BCE (Common angles)

Hence, by AA similarity criterion,

ΔPDC ~ ΔBEC

Hope It's Helpful....:)

@ItzPyscho17

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