AI generated article from Bing
Is there any known way to multiply three binomials using a method similar to the FOIL method? I have searched the internet and have not found any such method.
Is there a way to expand three binomials in one go; i.e. without first expanding two of them, then multiplying by the last one. so expanding: (x+2)(x+3)(x+1) without first having to expand to thi...
One mnemonic that might also help you recall how to multiply binomials (two terms in parentheses) is FOIL: First terms: x2 x 2; Outer terms: −x − x; Inner terms: 2x 2 x; Last terms: −2 − 2. The key fact to remember, as you do above, to *distribute$ each value of one term by multiplying it with each of the values of the second term (which can be generalized to non-binomial factors).
Multiplying three factorials with three binomials in polynomial identity Ask Question Asked 10 years, 8 months ago Modified 8 years, 7 months ago
In that case, multiplying the two polynomials represents another complicated operation that you need to express in terms of the two simpler ones (addition and multiplication).
Is there a formula/shortcut/simpler way of multiplying out linear factors corresponding to conjugate pairs of roots while the roots are in exponential form? Otherwise my result is a large and seemingly messy number of terms that must continue to be multiplied out.
As it is said in the mathematics books (at least the one I have), we are not permitted to divide or multiply both sides of an equation by a variable, because it is possible to lose some answers. For
Derivative of product of three functions: product rule Ask Question Asked 14 years, 4 months ago Modified 8 years, 7 months ago
It has different roots as well. Does this imply that multiplying or dividing both sides of a quadratic equation by a constant changes its characteristics? If so, does it also imply that we should not multiply or divide both sides of a quadratic equation by a constant when we try to find its roots?
Q&A for people studying math at any level and professionals in related fields