9.5 = variation functions
DESCRIPTION
9.5 = Variation Functions. Direct Variation. Direct Variation – y varies directly as x. Direct Variation – y varies directly as x y = k x. Direct Variation – y varies directly as x y = k x * Note: k = constant of variation (a #). - PowerPoint PPT PresentationTRANSCRIPT
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9.5 = Variation Functions
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Direct Variation
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Direct Variation – y varies directly as x
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Direct Variation – y varies directly as x
y = kx
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Direct Variation – y varies directly as x
y = kx
*Note: k = constant of variation (a #)
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Direct Variation – y varies directly as x
y = kx
*Note: k = constant of variation (a #)
Inverse Variation
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Direct Variation – y varies directly as x
y = kx
*Note: k = constant of variation (a #)
Inverse Variation – y varies inversely as x
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Direct Variation – y varies directly as x
y = kx
*Note: k = constant of variation (a #)
Inverse Variation – y varies inversely as x
y = k
x
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Direct Variation – y varies directly as x
y = kx
*Note: k = constant of variation (a #)
Inverse Variation – y varies inversely as x
y = k
x
Joint Variation
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Direct Variation – y varies directly as x
y = kx
*Note: k = constant of variation (a #)
Inverse Variation – y varies inversely as x
y = k
x
Joint Variation – y varies jointly as x and z
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Direct Variation – y varies directly as xy = kx
*Note: k = constant of variation (a #)Inverse Variation – y varies inversely as x
y = k x
Joint Variation – y varies jointly as x and zy = kxz
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20
a
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse
a
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
b. y = -0.5
x
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
b. y = -0.5
x
y = -0.5x
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
b. y = -0.5
x
y = -0.5x , direct
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
b. y = -0.5
x
y = -0.5x , direct, k = -0.5
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
b. y = -0.5
x
y = -0.5x , direct, k = -0.5
c. A = ½bh
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
b. y = -0.5
x
y = -0.5x , direct, k = -0.5
c. A = ½bh , joint
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Ex. 1 State whether each equation represents a direct, joint, or inverse variation. Then name the constant of variation.
a. ab = 20
b = 20 , inverse, k = 20
a
b. y = -0.5
x
y = -0.5x , direct, k = -0.5
c. A = ½bh , joint , k = ½
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx
18 = k(15)
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx
18 = k(15)
18 = 15k
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx
18 = k(15)
18 = 15k
18 = k
15
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx
18 = k(15)
18 = 15k
18 = k
15
6 = k
5
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx 2) y = kx
18 = k(15)
18 = 15k
18 = k
15
6 = k
5
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx 2) y = kx
18 = k(15) y = 6x
18 = 15k 5
18 = k
15
6 = k
5
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx 2) y = kx
18 = k(15) y = 6x
18 = 15k 5
18 = k
15
6 = k
5
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx 2) y = kx
18 = k(15) y = 6x
18 = 15k 5
18 = k y = 6(20)
15 5
6 = k
5
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Ex. 2 Find each value.
a. If y varies directly as x and y = 18 when x = 15, find y when x = 20.
1) y = kx 2) y = kx
18 = k(15) y = 6x
18 = 15k 5
18 = k y = 6(20)
15 5
6 = k y = 120
5 5
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Ex. 2 Find each value.a. If y varies directly as x and y = 18
when x = 15, find y when x = 20.1) y = kx 2) y = kx
18 = k(15) y = 6x 18 = 15k 5
18 = k y = 6(20) 15 5
6 = k y = 120 5 5
y = 24
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
1 = k
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
1 = k
2) y = kxz
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
1 = k
2) y = kxz
y = 1xz
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
1 = k
2) y = kxz
y = 1xz
y = 1(9)(-5)
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
1 = k
2) y = kxz
y = 1xz
y = 1(9)(-5)
y = -45
c. If y varies inversely as x and y = -14 when x = 12, find x when y = 21
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
1 = k
2) y = kxz
y = 1xz
y = 1(9)(-5)
y = -45
c. If y varies inversely as x and y = -14 when x = 12, find x when y = 21
1) y = k
x
-14 = k
12
-168 = k
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b. Suppose y varies jointly as x and z. Find y when x = 9 and z = -5, if y = -90 when z = 15 and x = -6
1) y = kxz
-90 = -6(15)k
-90 = -90k
1 = k
2) y = kxz
y = 1xz
y = 1(9)(-5)
y = -45
c. If y varies inversely as x and y = -14 when x = 12, find x when y = 21
1) y = k
x
-14 = k
12
-168 = k
2) y = k
x
21 = -168
x
x = -8