Giải giúp với ạ mình đang cần rất gấp ( cảm ơn trc ạ)
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![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
V Transformation
1 In spite being quite poor, the villagers live a happy and healthy way
2 Despite studying very hard, he still didn't pass the exam
3 Although Sylvia had no interest in folklore, she still enjoyed the story
4 Despite having much experience in machinery, he didn't succeed in repairing this machine
5 Though it was dark, they continued to work
6 In spite of having health problems, he is always smiling
7 Despite the difficult exam, Kieu Anh got good marks
8 THe man about whom I told you works in the hospital
9 Do you know the girl to whom Tom is talking?
10 The tree which stankds near the gate of my house has lovely flowers
11 The book which I was reading yesterday was a lovely story
12 Do you know the new student whose name I can't remember?
13 I will never forget the day when I first met her
14 The country where I was born is beautiful
15 Because of the polluted water, it was unsafe to drink
16 Because he work hard and methodically, John succeeded in his exam
17 I suggest getting together and talking about our presentation before we do it in class
18 When did you built this stilt house?
19 If you don't hurry up, you will be late for school
20 You must turn off the TV before 11p.m
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
a: Xét ΔBAD có BA=BD
nên ΔBAD cân tại B
hay \(\widehat{BAD}=\widehat{BDA}\)
b: \(\widehat{HAD}+\widehat{BDA}=90^0\)
\(\widehat{CAD}+\widehat{BAD}=90^0\)
mà \(\widehat{BAD}=\widehat{BDA}\)
nên \(\widehat{HAD}=\widehat{CAD}\)
hay AD là tia phân giác của góc HAC
c: Xét ΔADH vuông tại H và ΔADK vuông tại K có
AD chung
\(\widehat{HAD}=\widehat{KAD}\)
Do đó:ΔADH=ΔADK
Suy ra: AH=AK
![](https://rs.olm.vn/images/avt/0.png?1311)
Các số được điền vào các ô theo thứ tự từ trái sang phải là:
-1; - \(\dfrac{1}{3}\); \(\dfrac{2}{3}\); \(\dfrac{4}{3}\)
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
mở bài là giới thiệu về cụ nha mn em viết lộn ạ
thân bài là đóng góp ạ
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
a)![](data:image/png;base64,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)
b) Vì đây là mạch điện gồm 2 đèn mắc nối tiếp nên:
U=U1+U2=2,4+2,5=4,9(V)
c) Vì đây là mạch điện gồm 2 đèn mắc nối tiếp nên:\
U=U1+U2 => U2 = U-U1=11,2-5,8=5,4(V)
d)
Vì đây là mạch điện gồm 2 đèn mắc nối tiếp nên:\
U=U1+U2 => U1 = U-U2=23,2-11,5=11,7(V)
Bạn có thể ghi là Vì đây là mạch điện gồm 2 đèn mắc nối tiếp nên: rồi lm trực tiếp 3 câu bcd luôn nha ko cần ghi lại cx đc nha bạn