Answer:
The product of 8x(5x−6) is 40x^2−48x
The product of (x−3)(5x−6) is 5x^2−21x+18
Step-by-step explanation:
Verify each option
Part 1) The product of 8x(5x−6) is 40x^2−48x
we have
[tex]8x(5x-6)[/tex]
Applying distributive property
[tex]8x(5x)-8x(6)\\40x^2-48x[/tex]
Compare with the given value
[tex]40x^2-48x=40x^2-48x[/tex]
therefore
The statement is true
Part 2) The product of −4x(2x2+1) is −8x^3−5x
we have
[tex]-4x(2x^{2}+1)[/tex]
Applying distributive property
[tex]-4x(2x^{2})-4x(1)\\-8x^3-4x[/tex]
Compare with the given value
[tex]-8x^3-4x \neq -8x^3-5x[/tex]
therefore
The statement is not true
Part 3) The product of (x−3)(5x−6) is 5x^2−21x+18
we have
[tex](x-3)(5x-6)[/tex]
Applying distributive property
[tex]x(5x)-x(6)-3(5x)+3(6)\\5x^2-6x-15x+18\\5x^2-21x+18[/tex]
Compare with the given value
[tex]5x^2-21x+18=5x^2-21x+18[/tex]
therefore
The statement is true
Part 4) The product of (2x+3)(x^2+3x−5) is 2x^3+9x^2+9x−25
we have
[tex](2x+3)(x^2+3x-5)[/tex]
Applying distributive property
[tex](2x)(x^2+3x-5)+(3)(x^2+3x-5)\\(2x^3+6x^2-10x)+(3x^2+9x-15)\\2x^3+9x^2-x-15[/tex]
Compare with the given value
[tex]2x^3+9x^2-x-15 \neq 2x^3+9x^2+9x-25[/tex]
therefore
The statement is not true
