\displaystyle{0} Explanation: There is only one term to be simplified. Start with the inner brackets. \displaystyle{2}{\left({5}-{\left({\left({15}\div{3}\right)}\right)}\right)} \displaystyle={2}{\left({5}-{5}\right)} ...

\displaystyle{30} Explanation: Work inside the parentheses first. \displaystyle{10}\times{\left({\left({15}\div{5}\right)}\right)} = \displaystyle{10}\times{3} = \displaystyle{30}

See below \displaystyle{\left(\text{XXX}\right)}{217}\div{31}={7} Explanation: Draw a rectangle; place the dividend inside the rectangle (as an area to be divided) and the divisor outside to ...

\displaystyle\frac{{{\left({1}+{53}\right)}}}{{2}}=\frac{{{54}}}{{2}}={27} Explanation: Use BODMAS (Brackets Orders Division Multiplication Addition And Subtraction. First, add the numbers in ...

\displaystyle{11} Explanation: Unless you are using an older understanding of \displaystyle\div , the division should be performed before the subtraction. So: \displaystyle{15}-{8}\div{2}={15}-{4}={11} ...

Assuming the other is y, 3 1/3*y = 8, Dividing both sides with (3 1/3) >> (3 1/3y)/(3 1/3) = 8/(3 1/3)……{i} But 3 1/3 is the same as (3*3 + 1*1)/(1*3) Which = (9+1)/3, the same as 10/3 From ...