\(\def \u#1{\,\mathrm{#1}}\) \(\def \abs#1{\left|#1\right|}\) \(\def \ast{*}\) \(\def \deg{^{\circ}}\) \(\def \ten#1{\times 10^{#1}}\) \(\def \redcancel#1{{\color{red}\cancel{#1}}}\) \(\def \BLUE#1{{\color{blue} #1}}\) \(\def \RED#1{{\color{red} #1}}\) \(\def \PURPLE#1{{\color{purple} #1}}\) \(\def \th#1,#2{#1,\!#2}\) \(\def \lshift#1#2{\underset{\Leftarrow\atop{#2}}#1}}\) \(\def \rshift#1#2{\underset{\Rightarrow\atop{#2}}#1}}\) \(\def \dotspot{{\color{lightgray}{\circ}}}\)

Conservation of Charge

The reason Franklin described charge as "positive" and "negative", instead of something like "red" and "blue", is because the two types of charge cancel out: if you place $q=-4\u{nC}$ on an object and then $q=+4\u{nC}$ on the same object, the total charge on the object is $q=0$. (We say that the object is neutral in that case.) This is a consequence of an important law:

Thus an object can become less positive only if positive charge flows out of it OR if negative charge flows into it: it can't just "become" more or less positive without that flow.