Section 2.5 Variation.

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Presentation transcript:

Section 2.5 Variation

DIRECT VARIATION Let x and y denote two quantities. Then y varies directly with x, or y is directly proportional to x, if and only if y = kx The number k is called the constant of proportionality.

EXAMPLES Write an equation that expresses a relationship between C and r if C varies directly as r. Use the fact that C = 94.2 when r = 15 to solve for the variation constant. The number of semester hours (s) completed is directly proportional to the number of quarter hours (q) completed. If a student transferring to UGA with 45 quarter hours is credited with completing 30 semester hours, how many semester hours credit will a student have if the student completes 240 quarter hours?

DIRECT VARIATION WITH THE nth POWER Let x and y denote two quantities. Then y varies directly with the nth power of x if there is a constant k such that y = kxn.

EXAMPLE The distance (s) that a ball rolls down an inclined plane is directly proportional to the square of the time (t). If the ball rolls 5 feet in 1 second, how far will it roll in 4 seconds?

INVERSE VARIATION Let x and y denote two quantities. Then y varies inversely with x, or y is inversely proportional to x, if there is a constant k such that

EXAMPLE The speed (v) of a gear varies inversely as the number of teeth (t). If a gear that has 48 teeth makes 20 revolutions per minute, how many revolutions per minute will a gear that has 30 teeth make?

JOINT VARIATION Let x, y, and z denote three quantities. Then z varies jointly with x and y if there is a constant k such that z = kxy.

EXAMPLE The pressure (p) in a liquid varies jointly as the depth (d) and the density (D) of the liquid. If the pressure is 75 lb/in2 when the depth is 100 in. and the density is 2.4 lb/in2, find the pressure when the density remains the same and the depth is 120 in.

COMBINED VARIATION Combined variation is a combination of two or more of the types of variation already discussed.

EXAMPLE The frequency of vibration ( f ) of a guitar string varies directly as the square root of the tension (T) and inversely as the length (L) of the string. If the frequency is 36 vibrations per second when the tension is 36 lb and the string is 4 ft long, find the frequency when the tension is 25 lb and the length of the string is 2 ft.