a) The ratio of the perimeters of the similar figures is the ratio of their similar sides: 28 / 8 = (28÷4) / (8÷4) = 7 / 2
b) The ratio of the areas of the similar figures is the ratio of their perimeters raised to the second power: (7/2)² = 7² / 2² = 49 / 4
Q6. The answer is 30π in.
The circumference (C) of the circle with radius r is: C = 2 * π * r
According to the image, the radius of the circle is 15 in. r = 15 in.
Therefore, to calculate the circumference, we must substitute the value for radius in the formula for the circumference: C = 2 * π * 15 in = 30π in
Q7. The answer is 10.89π m².
The area of the circle (A) with radius r is: A = r²π
According to the image, the diameter of the circle is 6.6 m. We know that the radius is half of the diameter, therefore: r = 6.6 m / 2 = 3.3 m.
Now, substitute r in the formula for the area of the circle: A = 3.3²π A = 10.89π m²
Q8. The answer is 9.7 m².
Step 1. Calculate the area of the circle: A = r²π The radius is the half of the diameter, so: r = d/2 = 4.6 m / 2 = 2.3 m. The area of the circle is: A = (2.3 m)²π = 5.29π m² Since π = 3.14, then A = 5.29 * 3.14 m² = 16.6 m²
Step 2. We know that the whole circle is 360° and its area is 16.6 m². The area of the sector with a central angle of 210° is A₂₁₀. Make a proportion: 360° : 16.6 m² = 270° : A₂₁₀ A₂₁₀ = 210° × 16.6 m² : 360° A₂₁₀ = 9.7 m²
Q9. The answer is (270π + 81√3) m².
Step 1. Calculate the area of the whole circle: A1 = r²π r = 18 m A1 = 18²π = 324π m²
Step 2. Calculate the section of the circle excluding the sector with the triangle with the angle of 60°. If the whole circle is 360°, this sector is with the angle of 360° - 60° = 300°. To calculate the area of this sector (A₃₀₀), we will make a proportion: A1 : 360° = A₃₀₀ : 300° 324π : 360° = A₃₀₀ : 300° A₃₀₀ = 324π * 300° : 360° A₃₀₀ = 270π m²
Step 3. Calculate the area of the equilateral triangle: A2 = √3 a² / 4 a = 18 m A2 = √3 * 18²/4 = √3 * 81 A2 = 81√3 m²
Step 4. Sum up the areas of the sector with the angle of 300° (A₃₀₀) and the area of the triangle (A2) to get the area (A) of the shaded region: A = A₃₀₀ + A2 = 270π m² + 81√3 m² A = (270π + 81√3) m²
5/8. Keep in mind that a fraction is also division equation, and you are distributing 5 liters among 8 glasses. Five divided by eight; five over eight.
Number of male students who got 'A' in the test is 11
Number of female students who got 'A' in the test is 19
Total students who got 'A' in the test is 30
Probability that the male student got an 'A' is P(A | male) = (Number of male students who got 'A' in the test)/(Number of total students who got 'A' in the test) = <em><u>11/30</u></em>
