What is the solution set to the equation 4x^2 + 9x - 7 = 0?
a) {x = -1, x = 7/4}
b) {x = 1/4, x = -7/4}
c) {x = -7/4, x = 1/4}
d) {x = 7/4, x = -1}
Answer: c) {x = -7/4, x = 1/4}
Rationale: This is a quadratic equation. To find the solution
set, we can use the quadratic formula. Plugging in the
coefficients, we have x = (-9 ± √(9^2 - 4(4)(-7))) / (2(4)).
Simplifying the expression gives us x = (-9 ± √(81 + 112)) /
8, which further simplifies to x = (-9 ± √(193)) / 8.
Therefore, the solution set is {x = -7/4, x = 1/4}.
2.
Solve the inequality 2x^2 - 5x > 3.
a) x < -1/2 or x > 3
b) x < -3 or x > 1/2
c) x < -1/2 or x > 1/2
d) x < -3 or x > 2
Answer: a) x < -1/2 or x > 3
Rationale: To solve the inequality, we first set it equal to
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