The classification of connected Lie groups goes like this: every connected Lie group G has a Lie algebra \mathfrak{g} which determines the isomorphism class of its universal cover \widetilde{G}. ...

\displaystyle={1495}\frac{{17}}{{35}} Explanation: The first step in multiplying fractions is to change any mixed numbers to improper fractions. \displaystyle{a}\frac{{b}}{{c}}=\frac{{{c}\times{a}+{b}}}{{c}} ...

If we take "correct" to mean scientifically accurate, then it would be \displaystyle{0.66} . Explanation: Scientifically, we cannot claim knowledge of more information than is given. Thus even ...

Divide out the fraction and then multiply Explanation: \displaystyle\frac{{225}}{{225}}={1} so the problem can be simplified into \displaystyle{87}\times{1}\times{255} Multiplying this out ...

Hint: the torsion group of G is the group whose elements are those elements of G which have finite order . They form a subgroup of G. The identity element is by definition, in this torsion ...

This statement of (4CTM) is not right. You quoted from wiki, but if you read a little down this is what they say. " The intuitive statement of the four color theorem , i.e. 'that given any separation ...