Chapter 1 - 1.4 - Quadratic Equations and Applications - 1.4 Exercises - Page 110: 66

1 unique real solution

The quadratic equation : $\frac{4}{7}x^2-8x+28=0$ Use the discriminant to find the number of real solutions : $(-8)^2-4(\frac{4}{7})(28)=0$ Since the discriminant is zero, hence the number of unique real solutions for this equation is 1.