In the figure- Delta CDE is an equilateral triangle formed on a side CD of a square ABCD- Show that Delta ADE cong Delta BCE-

Question

Toppr Admin · Accepted Answer

-Refer to Image-Given ABCD is a square- CDE is an equilateral -x25B3- -To prove that -x394-ADE-x2245-x394-BCEProof- AD-BC -sides of a square-DE-EC -sides of equilateral -x25B3-x2220-ADE-x2220-BCE-90o-60o-150oHence- -x394-ADE-x2245-x394-BCEBy SAS congruency-

In the figure, ΔCDE is an equilateral triangle formed on a side CD of a square ABCD. Show that ΔADE≅ΔBCE.

(Refer to Image)Given ABCD is a square. CDE is an equilateral △ .To prove that ΔADE≅ΔBCEProof: AD=BC (sides of a square)DE=EC (sides of equilateral △)∠ADE=∠BCE=(90o+60o)=150oHence, ΔADE≅ΔBCEBy SAS congruency.

In the figure, $Δ C D E$ is an equilateral triangle formed on a side $C D$ of a square $A B C D$ . Show that $Δ A D E ≅ Δ B C E$ .