SAT Math Problem Set

Solution approach:

1. Let's call the number of miles driven m.
2. The daily charge is $45.
3. The mileage charge is $0.25 × m.
4. The total cost is $45 + $0.25m = $95
5. $0.25m = $95 - $45 = $50
6. m = $50 ÷ $0.25 = 200 miles

Answer: Tom drove 200 miles.

Key insight: This is a linear equation problem where you need to identify the variable and set up an equation based on the given information.

Solution approach:

1. Identify the total number of students: 200
2. Find the number of students who prefer Math: 56
3. Find the number of students who prefer English: 40
4. Add these numbers: 56 + 40 = 96 students
5. Calculate the probability: 96 ÷ 200 = 0.48 = 48%

Answer: The probability is 0.48 or 48%.

Key insight: This problem tests your ability to calculate probability from a frequency table by identifying the favorable outcomes and dividing by the total number of outcomes.

Solution approach:

1. Substitute x = -2 into the function f(x) = 2x² + 5x - 3
2. f(-2) = 2(-2)² + 5(-2) - 3
3. f(-2) = 2(4) + 5(-2) - 3
4. f(-2) = 8 - 10 - 3
5. f(-2) = -5

Answer: f(-2) = -5

Key insight: This problem tests your ability to evaluate a polynomial function at a specific value. Be careful with the negative signs when substituting and calculating.

Solution approach:

1. First, find angle C: 180° - 30° - 45° = 105°
2. Use the Law of Sines: sin(A)/a = sin(B)/b = sin(C)/c
3. We want to find AC, which is side b in this case
4. sin(B)/b = sin(C)/c, so b = c × sin(B)/sin(C)
5. We know c = AB = 6, B = 45°, and C = 105°
6. b = 6 × sin(45°)/sin(105°)
7. b = 6 × (√2/2)/(sin(105°))
8. b = 6 × (√2/2)/(cos(15°))
9. b = 6 × (√2/2)/(0.9659...)
10. b ≈ 4.41 units

Answer: AC ≈ 4.41 units

Key insight: This problem requires applying the Law of Sines to find an unknown side in a non-right triangle. Remember that trigonometric ratios are available for all triangles, not just right triangles.