Answer:
I. B. true
II. A true
Step-by-step explanation:
we can use the quadratic equation:
[tex]x=\frac{-b+-\sqrt{b^{2}-4*a*c}}{2*a}[/tex]
we have:
1)[tex]x^{2} -4x+5[/tex]
a=1 b=-4 c=5
[tex]x=\frac{-(-4)+-\sqrt{(-4)^{2}-4*1*5}}{2*1} \\\\x=\frac{4+-\sqrt{-4}}{2} \\\\x=\frac{4+-\sqrt{4} i}{2}\\\\x=\frac{4+-2i}{2} \\\\x_{1} =2-i\\\\x_{2} =2+i[/tex]
the quadratic expression has two complex factors.
2)[tex]x^{2} -5x+14[/tex]
a=1 b=-5 c=14
[tex]x=\frac{-(-5)+-\sqrt{(-5)^{2}-4*1*14}}{2*1} \\\\x=\frac{5+-\sqrt{-31}}{2} \\\\x=\frac{5+-\sqrt{31} i}{2}\\\\x_{1} =\frac{5-\sqrt{31}i }{2}\\ \\x_{2} =\frac{5+\sqrt{31}i }{2}[/tex]
the solution of [tex]x^{2} -5x+14[/tex] are
[tex]x_{1} =\frac{5-\sqrt{31}i }{2}\\\\or\\x_{2} =\frac{5+\sqrt{31}i }{2}[/tex]
3)[tex]2x^{2} -8x+5[/tex]
a=2 b=-8 c=5
[tex]x=\frac{-(-8)+-\sqrt{(-8)^{2}-4*2*5}}{2*2} \\\\x=\frac{8+-\sqrt{24}}{4} \\\\x=\frac{8+-2\sqrt{6}}{4}\\\\x_{1} =2-\frac{\sqrt{6}}{2}\\ \\x_{2} =2+\frac{\sqrt{6}}{2}[/tex]
