Match the value of the discriminant with the number of solutions Value of Discriminant Number of Solutions $$ \begin{array}{ll}\boxed{-v} 48 & ext { a. } 2 ext { Real Solutions } \ \boxed{-v}-40 & ext { b. } 1 ext { Real Solution } \ ext { c. No Real Solution }\end{array} $$

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Match the value of the discriminant with the number of solutions Value of Discriminant Number of Solutions $$ \begin{array}{ll}\boxed{-v} 48 & 	ext { a. } 2 	ext { Real Solutions } \ \boxed{-v}-40 & 	ext { b. } 1 	ext { Real Solution } \ 	ext { c. No Real Solution }\end{array} $$

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The key is understanding the sign of the discriminant, D, for a quadratic equation ax² + bx + c = 0: • If D > 0, there are 2 real solutions. • If D = 0, there is 1 real solution. • If D < 0, there are no real solutions. Now, match the given values: 1. For D = 48: Since 48 > 0, there are 2 Real Solutions. 2. For D = –40: Since –40 < 0, there are No Real Solutions. Additionally, although it isn’t explicitly given in the table, if the discriminant were 0, it would correspond to 1 Real Solution. Thus, the matches are: • 48 → 2 Real Solutions (Option a). • –40 → No Real Solutions (Option c). • (Implicit: 0 → 1 Real Solution, which would be Option b.) 48 corresponds to 2 Real Solutions, and –40 corresponds to No Real Solutions.

Match the value of the discriminant with the number of solutions Value of Discriminant Number of Solutions \( \begin{array}{ll}\boxed{-v} 48 & \text { a. } 2 \text { Real Solutions } \\ \boxed{-v}-40 & \text { b. } 1 \text { Real Solution } \\ \text { c. No Real Solution }\end{array} \)

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