1) our planet's (equatorial) circumference. Earth's diameter is approximately 8,000 miles, and the general formula for the circumference of a circle is C = π *d My intention is for you to do this with a function. The prototype might, for example, be: double calculateCircumference (double diameter); Call this function a second time to calculate and display the circumference of the Sun (whose diameter you can look up and is approximately 100 times that of Earth's). a) The distance between time zones along the equator is approximately 1,000 miles. Can you use this information to calculate and display the number of hours in a day? 2) our planet's surface area in square miles. The surface area of a sphere is given by SA = 477² As with the circumference, my intention is for you to write a function that performs this operation. Call this function a second time to determine the sun's surface area. a) By comparison, the surface area of Japan is approximately 150,000 sq. mi. About how many "copies" of Japan would it take to cover our planet?
1) our planet's (equatorial) circumference. Earth's diameter is approximately 8,000 miles, and the general formula for the circumference of a circle is C = π *d My intention is for you to do this with a function. The prototype might, for example, be: double calculateCircumference (double diameter); Call this function a second time to calculate and display the circumference of the Sun (whose diameter you can look up and is approximately 100 times that of Earth's). a) The distance between time zones along the equator is approximately 1,000 miles. Can you use this information to calculate and display the number of hours in a day? 2) our planet's surface area in square miles. The surface area of a sphere is given by SA = 477² As with the circumference, my intention is for you to write a function that performs this operation. Call this function a second time to determine the sun's surface area. a) By comparison, the surface area of Japan is approximately 150,000 sq. mi. About how many "copies" of Japan would it take to cover our planet?
C++ for Engineers and Scientists
4th Edition
ISBN:9781133187844
Author:Bronson, Gary J.
Publisher:Bronson, Gary J.
Chapter6: Modularity Using Functions
Section: Chapter Questions
Problem 7PP: (Numerical) Heron’s formula for the area, A, of a triangle with sides of length a, b, and c is...
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I need help figuring out this program and putting it in c++.
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