10t2-t-2=0 Two solutions were found :  t = -2/5 = -0.400  t = 1/2 = 0.500 Step by step solution : Step  1  :Equation at the end of step  1  : ((2•5t2) - t) - 2 = 0 Step  2  :Trying to factor by ...

\displaystyle{12}+{2}\times{10}^{{2}}−{6}\div{2}={209} Explanation: We should use the order of operations given by PEMDAS, first starting with Parentheses (none here), then Exponents, ...

1012*1035 Final result : (247•547) Step by step solution : Step  1  : 1.1     10 = 2•5 (10)35 = (2•5)35 = 235 • 535 Equation at the end of step  1  : (1012) • (235•535) Step  2  : 2.1     10 = 2•5 ...

\displaystyle{10}{q}{\left({q}+{11}\right)}{\left({q}-{11}\right)} Explanation: We can start by factoring out the 10 and a \displaystyle{q} : \displaystyle{10}{q}^{{3}}-{1210}{q} \displaystyle{10}{q}{\left({q}^{{2}}-{121}\right)} ...

\displaystyle{\left({10}\right)}^{{-{2}}}-{\left(-{10}\right)}^{{-{2}}}={0} Explanation: As \displaystyle{a}^{{-{m}}}=\frac{{1}}{{a}^{{m}}} and if n is an even integer \displaystyle{\left(-{a}\right)}^{{n}}={a}^{{n}} ...

If you consider using Newton method to find the zero of f(x)=x^3+x^2 (\text{Cb}+\text{Ka})-x (\text{Ca} \,\text{Ka}+\text{Kw})-\text{Ka} \, \text{Kw} f'(x)=3 x^2+2 x (\text{Cb}+\text{Ka})-(\text{Ca} \text{Ka}+\text{Kw}) ...