The answer is [tex]3x^4-13x^3-x^2-11x+6[/tex].
Solution:
Use algebraic identity: [tex]a^m\times a^n=a^{m+n}[/tex]
For example: [tex]x^2\times x=x^{2+1}=x^3[/tex]
Given expression [tex](x^2-5x+2)[/tex] and [tex](3x^2+2x+3)[/tex].
To multiply these equations.
[tex](x^2-5x+2)\times(3x^2+2x+3)[/tex]
[tex]=x^2(3x^2+2x+3)-5x(3x^2+2x+3)+2(3x^2+2x+3)[/tex]
[tex]=(3x^4+2x^3+3x^2)+(-15x^3-10x^2-15x)+(6x^2+4x+6)[/tex]
[tex]=3x^4+2x^3+3x^2-15x^3-10x^2-15x+6x^2+4x+6[/tex]
Combine like terms together.
[tex]=3x^4+(2x^3-15x^3)+(3x^2-10x^2+6x^2)-15x+4x+6[/tex]
[tex]=3x^4-13x^3-x^2-11x+6[/tex]
[tex](x^2-5x+2)\times(3x^2+2x+3)=3x^4-13x^3-x^2-11x+6[/tex]
Hence the answer is [tex]3x^4-13x^3-x^2-11x+6[/tex].
