Profit = 20% of $500,000 = 0.2 * 500,000 = $100,000.

Profit amount = 25% of $200,000 = 0.25 * 200,000 = $50,000.

Selling Price = Cost Price + Profit = 200 + (30% of 200) = 200 + 60 = $260.

Profit = 30% of $500,000 = 0.3 * 500,000 = $150,000.

Selling Price = Cost Price + Profit = 200 + (25% of 200) = 200 + 50 = $250.

10% of 1200 is calculated as (10/100) * 1200 = 120.

Points needed = 80 - 78 = 2.

$5000 / 0.10 = $50000.

Profit this year = Last Year Profit - (20% of Last Year Profit) = 500000 - (0.2 * 500000) = 500000 - 100000 = $400,000.

This Year's Profit = Last Year's Profit + (50% of Last Year's Profit) = 10000 + (0.5 * 10000) = 10000 + 5000 = $15,000.

Percentage Increase = ((New Revenue - Original Revenue) / Original Revenue) * 100 = ((1200000 - 1000000) / 1000000) * 100 = (200000 / 1000000) * 100 = 20%.

The total moment of inertia is I_cylinder + I_sphere = (1/2 MR^2) + (2/5 MR^2) = (7/10) MR^2.

Concave lenses always produce virtual and upright images regardless of the object distance.

Using the lens formula, 1/f = 1/v - 1/u, we find v = 8 cm.

For a concave lens, the image formed is virtual and erect when the object is placed beyond the focal length.

For a concave lens, the image formed is virtual and erect when the object is placed at any distance.

Using the lens formula, the image distance is calculated to be -16.67 cm.

Using the mirror formula, 1/f = 1/v + 1/u, where f = -10 cm (concave mirror), u = -30 cm. Solving gives v = -15 cm, which means the image is formed 15 cm in front of the mirror.

Using the mirror formula: 1/f = 1/v + 1/u, where f = -20 cm (concave mirror), v = -30 cm (image distance), we find u = 25 cm.

The radius of curvature (R) is twice the focal length (f). Therefore, R = 2f = 2 * 20 cm = 40 cm.

Using the mirror formula, 1/f = 1/v + 1/u. Here, f = -5 cm (concave mirror), u = -10 cm. Solving gives v = -10 cm.

Volume of cone = (1/3)πr²h; Volume of cylinder = πr²h. Therefore, cone's volume is one-third of the cylinder's volume.

Volume of a cone = (1/3)πr²h = (1/3)π(2)²(6) = (1/3)π(4)(6) = 8π cm³.

The surface area of a cone is given by SA = πr(r + l), where l is the slant height. Here, l = √(r² + h²) = √(2² + 6²) = √40. Thus, SA = π(2)(2 + √40) = 20π.

The surface area of a cone is given by SA = πr(r + l), where l is the slant height. Here, l = √(3² + 4²) = 5, so SA = π(3)(3 + 5) = 24π.

The volume of a cone is given by V = (1/3)πr²h. Here, r = 4 and h = 9, so V = (1/3)π(4)²(9) = 48π.

The surface area of a cone is given by SA = πr(r + l), where l is the slant height. Here, l = √(5² + 12²) = 13, so SA = π(5)(5 + 13) = 90π cm².

Volume = (1/3)πr²h = (1/3)π(2)²(6) = (1/3)π(4)(6) = 8π ≈ 25.13 cm³.

Volume = 1/3 × πr²h = 1/3 × π × (2 cm)² × 9 cm = 12π cm³.

Volume = 1/3 × πr²h = 1/3 × π × (3 cm)² × 4 cm = 12π cm³.