Code classasciimath3eb fc ad b c ebfcaedf a abedcf b abcd c...

code class="asciimath">3．右图中，EB 与 FC 垂直于直线 AD ，垂足为 B 及 C 。已知 EB=FC,AE=DF ，（a）证明 ()/(_(()/())ABE)~()/(_(()/()))=DCF ；（b）证明 AB=CD ；（c）证明 A(E)/(()/())DF 。

Transcript

00:01 Question number 13 here you are given a diagram like this okay so this is c t a b this is angle 1 2 3 it is given that this two lines ab and b c r a b and ab and b both are come to each other and also it is given that fb is perpendicular to a right so and this angle a and angle a and angle e and also along with that angle two and angle three are going to each other you have to prove that that cb is equal to cb and d b are congruent to each other right so let us do it let us write the state and the reason so first statement is angle a is congruent to angle e second one is a b i is congruent to be right third one is angle two is congruent to angle three right all these are given so you can write it here it is given two is also given three also divided and it is fourth one you can say angle measurement of angle f b a is equal to 90 degree measurement of angle f be also 90 degree this is because fb is perpendicular to a is right now i can see this a 2 and 1 f b e sum of 3 and 4 so you can see 1 and 2 are angle 1 are supplement to each other similar they can say angle 3 and 4 are also supplement each other because combined together they are making 90 degree so reason is can see 4 some 4 point you can mean so is now if from point 3 angle 2 1 3 angle 2 1 3 here congruent so you can see the corresponding supplementary of a also will be complement we also congruent to each other so angle one also will be congruent to angle four right so you can write supplement of congruent angle or also so and we have angle two congruent to angle three as for three here so one one or one another are also congruent right so now you can write can see angle a b c and b or the triangle ac b a also come down to triangle e d b why because two lines two angles and one side come down to each other so you can see side side is ab so it is 2 point to have mentioned that angle a equal there is 1 and again you have 1 so we're congruent to each other two triangles then corresponding sides also will be congruent of that triangle so you can write c b then you also congruent to b this is again can write the principle is c p c tc corresponding part of congruent triangle are also congruent, right? hence, c .b also congruent to d .b...

Question

code class="asciimath">3．右图中，EB 与 FC 垂直于直线 AD ，垂足为 B 及 C 。 已知 EB=FC,AE=DF ， （a）证明 ()/(_(()/())ABE)~()/(_(()/()))=DCF ； （b）证明 AB=CD ； （c）证明 A(E)/(()/())DF 。

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code class="asciimath">3．右图中，EB 与 FC 垂直于直线 AD ，垂足为 B 及 C 。已知 EB=FC,AE=DF ，（a）证明 ()/(_(()/())ABE)~()/(_(()/()))=DCF ；（b）证明 AB=CD ；（c）证明 A(E)/(()/())DF 。