Square, Rectangle, Parallelogram Problems, 2

Category: Analytic Geometry, Plane Geometry

"Published in Newark, California, USA"

The diagonals of a square of side 4 lie on the axes and its center at the origin. Find the coordinates of its vertices.

Solution:

If the center of a square is located at the origin, then the diagonals will be bisected into equal parts. Since the diagonals are located along the axes, then the sides of a square will be the hypotenuse of the four isosceles right triangles. To illustrate the problem, it is better to draw the figure as follows

Photo by Math Principles in Everyday Life

Consider the right triangle at the first quadrant and apply Pythagorean Theorem, we have 

Therefore, the coordinate of the vertices are

 

Square, Rectangle, Parallelogram Problems

Category: Analytic Geometry, Plane Geometry

"Published in Newark, California, USA"

A square of side 4 has its center at the origin and sides parallel to the axes. Find the coordinates of its vertices.

Solution:

If the center of a square is located at the origin, then the diagonals will be bisected into equal parts. Also, if the center of a square is located at the origin, then the axes will bisect the sides of a square into equal parts. To illustrate the problem, it is better to draw the figure as follows

Photo by Math Principles in Everyday Life

Therefore, the coordinates of the vertices are

V₁ (2, 2), V₂ (2, -2), V₃ (-2, -2) and V₄ (-2, 2).

Circular Arc Problems, 2

Category: Plane Geometry, Physics

"Published in Vacaville, California, USA"

How many revolutions will a car wheel of diameter 28 in. make over a period of half an hour if the car is traveling at 60 mi/hr?

Solution:

To illustrate the problem, it is better to draw the figure as follows

Photo by Math Principles in Everyday Life

This is a good application of circular arc problems in getting the number of revolutions of a car wheel especially when you're driving a car. In this problem, the distance traveled is not given but the speed or velocity and time are given. If you know the speed and time,then you can calculate the distance traveled as follows

where S is the distance traveled, V is the speed or velocity, and t is the travel time. Substitute the values of V and t, we have

Since the radius of a car wheel is expressed in inches, then we have to convert the distance traveled by car in inches as follows

Finally, we can get the number of revolutions of a car wheel as follows

where S is the total distance traveled or total length of a circular arc, R is the radius of a circle, and θ is the total angle of a circular arc in radians. Radians is a unit less value of an angle. 

Substitute the values of S and R in order to solve for the value of total angle, we have

Therefore, the number of revolutions of a car wheel is