a2-6a-40=0 Two solutions were found :  a = 10  a = -4 Step by step solution : Step  1  :Trying to factor by splitting the middle term  1.1     Factoring  a2-6a-40  The first term is,  a2  its ...

\displaystyle{6}{t}^{{2}}+{13}{t}-{63}={\left({3}{t}-{7}\right)}{\left({2}{t}+{9}\right)} [ Explanation: \displaystyle{6}{t}^{{2}}+{13}{t}-{63}={6}{t}^{{2}}+{27}{t}-{14}{t}-{63}={3}{t}{\left({2}{t}+{9}\right)}-{7}{\left({2}{t}+{9}\right)}={\left({3}{t}-{7}\right)}{\left({2}{t}+{9}\right)} ...

\displaystyle{\left({5}{a}-{1}\right)}{\left({a}+{1}\right)}{\left({a}-{1}\right)} Explanation: \displaystyle{5}{a}^{{3}}-{a}^{{2}}-{5}{a}+{1}={5}{a}^{{3}}-{5}{a}^{{2}}+{4}{a}^{{2}}-{4}{a}-{a}+{1}={5}{a}^{{2}}{\left({a}-{1}\right)}+{4}{a}{\left({a}-{1}\right)}-{1}{\left({a}-{1}\right)}={\left({5}{a}^{{2}}+{4}{a}-{1}\right)}{\left({a}-{1}\right)}={\left({5}{a}^{{2}}+{5}{a}-{a}-{1}\right)}{\left({a}-{1}\right)}={\left\lbrace{5}{a}{\left({a}+{1}\right)}-{1}{\left({a}+{1}\right)}\right\rbrace}{\left({a}-{1}\right)}={\left({5}{a}-{1}\right)}{\left({a}+{1}\right)}{\left({a}-{1}\right)} ...

a4-a2-42 Final result : (a2 + 6) • (a2 - 7) Step by step solution : Step  1  :Trying to factor by splitting the middle term  1.1     Factoring  a4-a2-42  The first term is,  a4  its coefficient is ...

b2-3b-28=0 Two solutions were found :  b = 7  b = -4 Step by step solution : Step  1  :Trying to factor by splitting the middle term  1.1     Factoring  b2-3b-28  The first term is,  b2  its ...

a2+7a+10=0 Two solutions were found :  a = -2  a = -5 Step by step solution : Step  1  :Trying to factor by splitting the middle term  1.1     Factoring  a2+7a+10  The first term is,  a2  its ...