The player earns 10 points for each win (3 wins = 30 points) and 5 points for each draw (2 draws = 10 points), totaling 30 + 10 = 40 points.

The total points are calculated as (3 wins * 10 points) + (2 draws * 5 points) = 30 points.

Points = (Wins * 10) + (Draws * 5) = (3 * 10) + (2 * 5) = 30.

Points = (Wins * 3) + (Draws * 1) + (Losses * 0) = (5 * 3) + (2 * 1) + (3 * 0) = 15 + 2 + 0 = 17 points.

Scoring 30 points indicates that the player performed above the team's average of 25 points.

To find the percentage, divide the player's score by the winning score and multiply by 100. (30/50) * 100 = 60%.

The measure of each interior angle in a regular polygon is given by the formula [(n-2) * 180] / n. For a decagon (n=10), it is [(10-2) * 180] / 10 = 144 degrees.

The measure of each interior angle in a regular polygon can be calculated using the formula [(n-2) * 180] / n. For n=10, it is 144 degrees.

The number of diagonals that can be drawn from one vertex of an n-sided polygon is given by (n-3). For a dodecagon (12-sided polygon), it is 12-3 = 9.

The measure of each exterior angle of a regular polygon can be calculated using the formula 360/n, where n is the number of sides. For a dodecagon (12 sides), it is 360/12 = 30 degrees.

The measure of each exterior angle of a regular polygon is calculated as 360/n, where n is the number of sides. For a dodecagon (12 sides), it is 360/12 = 30 degrees.

Using the formula n(n-3)/2, for an octagon (n=8), the number of diagonals is 8(8-3)/2 = 20.

The measure of each interior angle of a regular polygon can be calculated using the formula [(n-2) * 180] / n. For an octagon (n=8), it is [(8-2) * 180] / 8 = 135 degrees.

The sum of the interior angles of an octagon (8-sided polygon) is calculated using the formula (n-2) * 180, which gives (8-2) * 180 = 1080 degrees.

In the polynomial P(x), the coefficient of the x^2 term is -4.

In the polynomial P(x), the coefficient of x^2 is -4.

The roots of the polynomial can be found by factoring it as (x - 2)(x - 3) = 0, giving roots 2 and 3.

The roots of the polynomial can be found by factoring it as (x - 2)(x - 3) = 0, giving roots 2 and 3.

The roots of the polynomial can be found by factoring it as (x - 2)(x - 3) = 0, giving roots 2 and 3.

By applying the Rational Root Theorem and synthetic division, we can find that p(x) has three distinct real roots.

Population after 2 years = 1000 * (1 + 0.10)^2 = 1000 * 1.21 = 1210.

After 1 year, the population will be 1000 * 1.15 = 1150. After 2 years, it will be 1150 * 1.15 = 1322.5, rounded to 1325.

Let the initial population be 100. After a 15% increase, it becomes 115. After a 10% decrease, it becomes 115 - 11.5 = 103.5. The net change is (103.5 - 100) / 100 * 100% = 3.5%.

Population after 1 year = 1,000 * 1.05 = 1,050. After 2 years = 1,050 * 1.05 = 1,102.5.

Loss = Cost Price - Selling Price = $150 - $120 = $30. Percentage loss = (Loss/Cost Price) * 100 = ($30/$150) * 100 = 20%.

Selling Price = $500 - (30% of $500) = $500 - $150 = $350. Since Selling Price = Cost Price, there is no profit or loss.

Discount = Marked Price - Selling Price = 500 - 450 = 50. Discount Percentage = (50/500) * 100 = 10%.

Let the cost price be x. Then, 80 = x - (20% of x) => 80 = x - 0.2x => 80 = 0.8x => x = 100.

Let the marked price be x. After a 25% discount, the selling price is x - (0.25 * x) = 0.75x. Setting this equal to $150 gives 0.75x = $150, so x = $200.

Let the original price be x. After a 25% discount, the selling price is x - (0.25 * x) = 0.75x. Thus, 0.75x = $150, so x = $150 / 0.75 = $200.