Hey there,
Use the discriminant to determine how many real number solutions exist for the quadratic equation:
-3x² + 4x - 14 = 0
∆ = b² - 4ac
∆ = 4² - 4*(-3)*(-14)
∆ = 16 - (-12)*(-14)
∆ = 16 - 168
∆ = -152
∆ = -152 < 0 ; There is no real number solution for the quadratic equation
S= { ø }
✅✅;-)
Answer:
Step-by-step explanation:
In the question we have given an equation that is -3x² + 4x - 13 = 0 and we are asked to determine how may real number of solutions exist for given quadratic equations .
We Know That ,
b² - 4ac determines whether the Quadratic Equation ax² + bx + c = 0 has real roots or not , b² - 4ac is called discriminant of this quadratic equations .
So , a quadratic equation ax² + bx + c = 0 has
(i) Two distinct real roots , if b² - 4ac > 0 ,
(ii) Two equal roots , if b² - 4ac = 0 ,
(iii) No real roots , if b² - 4ac < 0 .
In given equation −3x² + 4x − 13 = 0 ,
Solution : -
[tex] \longrightarrow \: \pink{ \boxed{ D = b {}^{2} - 4ac}} \longleftarrow[/tex]
Substituting values :
[tex] \longmapsto \: D = (4) {}^{2} - 4( - 3)( - 13)[/tex]
Calculating further :
[tex] \longmapsto \: D = 16 - 4(39)[/tex]
[tex] \longmapsto \: D = 16 -156[/tex]
[tex] \longmapsto \: \boxed{\bold{ D = - 140}}[/tex]
Here discriminant is less than 0 ( D = -140 < 0 ) .
