Answer:
1. [tex]a=b=\dfrac{3}{4}[/tex]
2. [tex]a=-3,\ b=3[/tex]
Step-by-step explanation:
1. Given:
[tex]\dfrac{3x}{(x-2)(3x+2)}=\dfrac{a}{x-2}+\dfrac{b}{3x+2}[/tex]
To find a and b, add two fractions in right side:
[tex]\dfrac{a}{x-2}+\dfrac{b}{3x+2}\\ \\=\dfrac{a(3x+2)+b(x-2)}{(x-2)(3x+2)}\\ \\=\dfrac{3ax+2a+bx-2b}{(x-2)(3x+2)}\\ \\=\dfrac{(3a+b)x+(2a-2b)}{(x-2)(3x+2)}[/tex]
So,
[tex]\dfrac{3x}{(x-2)(3x+2)}=\dfrac{(3a+b)x+(2a-2b)}{(x-2)(3x+2)}[/tex]
Two fractions with same denominators are equal when they have equal numerators, so
[tex]3x=(3a+b)x+(2a-2b)[/tex]
Equate coefficients:
[tex]At\ x:\ \ 3=3a+b\\ \\At \ 1: 0=2a-2b[/tex]
From the second equation:
[tex]a=b[/tex]
Substitute it into the first equation:
[tex]3b+b=3\\ \\4b=3\\ \\b=\dfrac{3}{4}[/tex]
Hence,
[tex]\dfrac{3x}{(x-2)(3x+2)}=\dfrac{\frac{3}{4}}{x-2}+\dfrac{\frac{3}{4}}{3x+2}[/tex]
2. Given:
[tex]\dfrac{3}{x^2-5x+6}=\dfrac{a}{x-2}+\dfrac{b}{x-3}[/tex]
Note that [tex](x-2)(x-3)=x^2-3x-2x+6=x^2-5x+6[/tex]
To find a and b, add two fractions in right side:
[tex]\dfrac{a}{x-2}+\dfrac{b}{x-3}\\ \\=\dfrac{a(x-3)+b(x-2)}{(x-2)(x-3)}\\ \\=\dfrac{ax-3a+bx-2b}{(x-2)(x-3)}\\ \\=\dfrac{(a+b)x+(-3a-2b)}{(x-2)(x-3)}[/tex]
So,
[tex]\dfrac{3}{(x-2)(x-3)}=\dfrac{(a+b)x+(-3a-2b)}{(x-2)(x-3)}[/tex]
Two fractions with same denominators are equal when they have equal numerators, so
[tex]3=(a+b)x+(-3a-2b)[/tex]
Equate coefficients:
[tex]At\ x:\ \ 0=a+b\\ \\At \ 1: 3=-3a-2b[/tex]
From the first equation:
[tex]a=-b[/tex]
Substitute it into the second equation:
[tex]-3(-b)-2b=3\\ \\3b-2b=3\\ \\b=3\\ \\a=-3[/tex]
Hence,
[tex]\dfrac{3}{x^2-5x+6}=\dfrac{-3}{x-2}+\dfrac{3}{x-3}[/tex]
