JaJiJ_a \cap J_idhdt>0\frac{dh}{dt} > 0(hbasehwell)Xhill(h_{base} \to h_{well}) \in \mathbb{X}_{hill}
Jack and Jillwent upthe hill,

Ja,Ji{kids(h, p, c)}; dhdt>0J_{a}, J_{i} \in \{\text{kids(h, p, c)}\}; \space \frac{dh}{dt} > 0


(xi,)(xj,1)(xi,1)(x_{i}, \emptyset) \to (x_{j}, \mathbb{1}) \to (x_{i},\mathbb{1})pwp \ni w=pfull= p_{full}
To fetcha pail ofwater.

(pfullhwell)(pfullhbase)(p_{full} \cap h_{well}) \to (p_{full} \cap h_{base})


JaJ_adhJadtt=t10\frac{dh_{J_{a}}}{dt} \bigg\|_{t=t_1} \ll 0
Jackfell down,

t1 s.t. dhJadtt=t10\exists t_1 \text{ s.t. } \frac{dh_{J_{a}}}{dt} \bigg|_{t=t_1} \ll 0


c{c1}c{i=1n>1ci}c\{c_{1}\} \to c\{\bigcup_{i=1}^{n>1} c_i\}cJac_{J_{a}}
And brokehis crown.

c1i=1nci(n2,CiCj= for ij)c_{1} \to \bigcup_{i=1}^{n} c_i \quad (n \ge 2, \quad C_i \cap C_j = \emptyset \text{ for } i \neq j)


JiJ_{i}dhJidtt=t20\frac{dh_{J_{i}}}{dt} \bigg\|_{t=t_2} \ll 0t2>t1\exists t_2 > t_1
And Jillcame tumblingafter.

t2>t1 s.t. dhJidtt=t20\exists t_2 > t_1 \text{ s.t. } \frac{dh_{J_{i}}}{dt} \bigg|_{t=t_2} \ll 0