Question

please send all algebraic formula and identities .
don't extra comment ​

Answer 1

Answer:

What algebraic indentities ?

Those equntions of algebra which are the true for every value of the variables present in the equation are as algebra indentities . the algebraic identities are also help in the factorization of polynomials The unity factor in the computation of algebraic expression is find this way you may have read some of them in previous grades however we will try and brush up the previous few lessons and then proceed with some example of algebra indentities.

for example:

The Identity(x+y)2=X2+2xy+y2 will be the same value of x and y.

the standard algebraic identities:

.(a+b2) =a2+2ab+b2

.(a-b2)=a2-2ab+b2

etc

I hope you like my answer

please mark me as brainlist

Answer 2

Answer:

$\begin{gathered}\boxed{\begin{array}{l}\boxed{\bigstar\:\:\textbf{\textsf{Algebric\:Identity}}\:\bigstar}\\\\\frak{1.}\bf\:(A+B)^{2} = A^{2} + 2AB + B^{2}\\\\\frak{2.}\sf\: (A-B)^{2} = A^{2} - 2AB + B^{2}\\\\\frak{3.}\bf\: A^{2} - B^{2} = (A+B)(A-B)\\\\\frak{4.}\sf\: (A+B)^{2} = (A-B)^{2} + 4AB\\\\\frak{5.}\bf\: (A-B)^{2} = (A+B)^{2} - 4AB\\\\\frak{6.}\sf\: (A+B)^{3} = A^{3} + 3AB(A+B) + B^{3}\\\\\frak{7.}\bf\:(A-B)^{3} = A^{3} - 3AB(A-B) + B^{3}\\\\\frak{8.}\sf\: A^{3} + B^{3} = (A+B)(A^{2} - AB + B^{2})\\\\\end{array}}\end{gathered}$