<span>2down votefavoriteI will quote a question from my textbook, to prevent misinterpretation:Let <span>GG</span> be a finite abelian group and let <span>mm</span> be the least common multiple of the orders of its elements. Prove that <span>GG</span> contains an element of order <span>mm</span>.I figured that, if <span><span>|G|=n</span><span>|G|=n</span></span>, then I should interpret the part with the least common multiple as <span><span>lcm(|<span>x1</span>|,…,|<span>xn</span>|)=m</span><span>lcm(|<span>x1</span>|,…,|<span>xn</span>|)=m</span></span>, where <span><span><span>xi</span>∈G</span><span><span>xi</span>∈G</span></span> for <span><span>0≤i≤n</span><span>0≤i≤n</span></span>, thus, for all such <span><span>xi</span><span>xi</span></span>, <span><span>∃<span>ai</span>∈N</span><span>∃<span>ai</span>∈N</span></span> such that <span><span>m=|<span>xi</span>|<span>ai</span></span><span>m=|<span>xi</span>|<span>ai</span></span></span>. I guess I should use the fact that <span><span>|<span>xi</span>|</span><span>|<span>xi</span>|</span></span> divides <span><span>|G|</span><span>|G|</span></span>, so <span><span>∃k∈N</span><span>∃k∈N</span></span> such that <span><span>|G|=k|<span>xi</span>|</span><span>|G|=k|<span>xi</span>|</span></span> for all <span><span><span>xi</span>∈G</span><span><span>xi</span>∈G</span></span>. I'm not really sure how to go from here, in particular how I should use the fact that <span>GG</span> is abelian.</span>
The reaction rates of the substances whether disappearance of a reactant or the appearance of a product are related to each other by the chemical reaction. The reaction rates are related as follows:
"<span>using shaving cream, rather than shaving on dry skin" I believe this is the answer. coz rest of them would increase friction rather than decrease</span>
