![](https://rs.olm.vn/images/avt/0.png?1311)
Hãy nhập câu hỏi của bạn vào đây, nếu là tài khoản VIP, bạn sẽ được ưu tiên trả lời.
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
a,\(\Rightarrow a=\dfrac{v-vo}{t}=\dfrac{15-0}{2.60}=0,125m/s^2\)
b,\(\Rightarrow S=\dfrac{v^2-vo^2}{2a}=900m\)
c,\(\Rightarrow v=vo+at=>20=0+0,125t=>t=160s\)
d,\(\Rightarrow S=\dfrac{20^2}{2.0,125}=1600m\)
![](https://rs.olm.vn/images/avt/0.png?1311)
- Quãng đường người đó cần chạy là : \(S=1,6.100=160m\)
- Tốc độ trung bình để chạy trong 1s là : \(v=\dfrac{S}{t}=\dfrac{160}{1}=160\left(m/s\right)\)
Vậy ....
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
1, đổi 100 g = 0,1 kg
P = m . g = 1 N
điềm 1
2, điền
\(a=\dfrac{v-v_0}{t-t_0}=\dfrac{5}{2}\)
3, đổi 500g = 0,5 kg
điền F = ma = 1 N
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
bt1: \(\Rightarrow vtb=\dfrac{2.60+3.40}{5}=48km/h\)
bt2. chon O\(\equiv\)dia diem xe dap xuat phat, chieu(+) la chieu xe dap chuyen dong
-moc tgian luc 7h
\(\Rightarrow\left\{{}\begin{matrix}x1=15t\\x2=10+5t\end{matrix}\right.\) \(\left(km,h,\right)\)gap nhau \(\Rightarrow x1=x2=>t=1h\)
vi tri gap nhau cach A: \(S=x1=15.1=15km\)
bt3: chon \(Ox\equiv AB,O\equiv A,\)moc tgian luc 6h30'
chieu (+) A->B
a,\(\Rightarrow x1=30t\left(km,h\right)\)
b,\(\Rightarrow t=2,5h\Rightarrow x1=30.2,5=75km\)
=>luc 8h vi tri xe cach A(O) 75km
c, giong y (b) \(\Rightarrow t=\dfrac{75}{30}=2,5h\)
15gi su \(v1>v2\). \(\Rightarrow\left\{{}\begin{matrix}v1+v2=\dfrac{25}{\dfrac{15}{60}}=100\\v1-v2=\dfrac{5}{\dfrac{15}{60}}=20\end{matrix}\right.\)\(\Leftrightarrow\left\{{}\begin{matrix}v1=60km/h\\v2=40km/h\end{matrix}\right.\)
16. a, \(\Rightarrow\left\{{}\begin{matrix}S1=54t\left(km\right)\\S2=36t\left(km\right)\end{matrix}\right.\)
chon chieu (+) la chieu chuyen dong 2xe , goc tgian tai 8h
\(\Rightarrow\left\{{}\begin{matrix}x1=54t\\x2=9+36t\end{matrix}\right.\)
b,![](data:image/png;base64,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)
c, can cu do thi =>vi tri oto duoi kip xe may cach A: 27km
luc gap nhau la luc 8h30'
ktra lai: \(\Rightarrow x1=x2\Rightarrow t=0,5h\Rightarrow x1=0,5.54=27\)
(gap nhau luc 8h30')
17. chon \(Ox\equiv AB,O\equiv A\), goc tgian luc 7h, chieu(+) tu A->B
a,\(\Rightarrow\left\{{}\begin{matrix}xA=40t\\xB=340-60\left(t-1\right)\end{matrix}\right.\)
b,\(\Rightarrow xA=xB\Rightarrow t=4h\)
=>vi tri gap nhau cach A: \(S=xA=40.4=160km\)
c,\(\Rightarrow d=\left|40t-340+60\left(t-1\right)\right|=\left|40.2,5-340+60\left(2,5-1\right)\right|=150km\)
d,\(\Rightarrow\left|40t-340+60\left(t-1\right)\right|=75\Rightarrow\left[{}\begin{matrix}t=4,75h\\t=3,25h\end{matrix}\right.\)