\displaystyle{3}{a}^{{2}}\cdot{3}{a}={\left({3}\cdot{a}\cdot{a}\right)}\cdot{\left({3}\cdot{a}\right)}={3}\cdot{3}\cdot{a}\cdot{a}\cdot{a}={9}{a}^{{3}} Explanation: We're being asked to simplify ...

\displaystyle-{9}{a}^{{4}} Explanation: Multiply 3*(-3) and it is -9. Multiply \displaystyle{a}^{{2}}\cdot{a}^{{2}} and it is " \displaystyle{a} " to the power of 2+2 (that is 4) ---> \displaystyle{a}^{{4}} ...

\displaystyle{15}{a}^{{5}} Explanation: \displaystyle{3}\cdot{5}={15} and \displaystyle{a}^{{2}}\cdot{a}^{{3}}={a}^{{{2}+{3}}}={a}^{{5}}

Anthony X Apr 28, 2016 Think about the definition of exponents: repeated multiplication. Therefore, \displaystyle{4}^{{5}} is basically just \displaystyle{4}\cdot{4}\cdot{4}\cdot{4}\cdot{4} ...

(i) \displaystyle{p}_{\text{ideal}}=\text{4.70 atm} : (ii) \displaystyle{p}_{\text{vdW}}=\text{4.58 atm} This tells you that the van der Waals equation of state picks up on the attractive ...

By AM-GM inequality, \dfrac{\dfrac a2+\dfrac a2+\dfrac b3+\dfrac b3+\dfrac b3}5\ge\sqrt[5]{\dfrac a2\cdot\dfrac a2\cdot\dfrac b3\cdot\dfrac b3\cdot\dfrac b3} Can you use the same idea for x+x+x+y+y?