If the given function contradicts the theorem: “Let ϕ be a solution to ( 1 ) on ( a , b ) . If ϕ has an infinite number of zeroes in any closed, bounded interval [ a ′ , b ′ ] ⊂ ( a , b ) , then ϕ ( x ) ≡ 0 in ( a , b ) . d d x ( p ( x ) d y d x ) + Q ( x ) y = p ( x ) y ″ + p ′ ( x ) y ′ + Q ( x ) y = 0 , a < x < b . ( 1 ) ”

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Answer 1

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Chapter 11.8, Problem 2E

To determine

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

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Suppose an experiment was conducted to compare the mileage(km) per litre obtained by competing brands of petrol I,II,III. Three new Mazda, three new Toyota and three new Nissan cars were available for experimentation. During the experiment the cars would operate under same conditions in order to eliminate the effect of external variables on the distance travelled per litre on the assigned brand of petrol. The data is given as below: Brands of Petrol Mazda Toyota Nissan I 10.6 12.0 11.0 II 9.0 15.0 12.0 III 12.0 17.4 13.0 (a) Test at the 5% level of significance whether there are signi cant differences among the brands of fuels and also among the cars. [10] (b) Compute the standard error for comparing any two fuel brands means. Hence compare, at the 5% level of significance, each of fuel brands II, and III with the standard fuel brand I. [10]

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Use the method of undetermined coefficients to solve the given nonhomogeneous system.X' = −1 33 −1 X + −4t2t + 2 X(t) =

Answer 2

Question

Chapter 11.8, Problem 2E

To determine

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

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Answer 3

Question

Chapter 11.8, Problem 2E

To determine

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

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Answer 4

Question

Chapter 11.8, Problem 2E

To determine

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

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Answer 5

Chapter 11.8, Problem 2E

To determine

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

Answer 6

Chapter 11.8, Problem 2E

To determine

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

Answer 7

Chapter 11.8, Problem 2E

To determine

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

Answer 8

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Answer 9

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Answer 10

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Answer 11

Ch. 11.2 - In Problems 1-12, determine the solutions, if any,...Ch. 11.2 - In Problems 1-12, determine the solutions, if any,...Ch. 11.2 - Prob. 3E Ch. 11.2 - In Problems 1-12, determine the solutions, if any,...Ch. 11.2 - In Problems 1-12, determine the solutions, if any,...Ch. 11.2 - In Problems 1-12, determine the solutions, if any,...Ch. 11.2 - Prob. 7E Ch. 11.2 - In Problems 1-12, determine the solutions, if any,...Ch. 11.2 - Prob. 9E Ch. 11.2 - In Problems 1-12, determine the solutions, if any,...

Solution Summary: The author explains that the given function doesn't contradict the theorem.

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If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

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Chapter 11 Solutions

Solution Summary: The author explains that the given function doesn't contradict the theorem.

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If the given function contradicts the theorem: “Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b). ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”

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Chapter 11 Solutions

If the given function contradicts the theorem:

“Let ϕ be a solution to (1) on (a,b). If ϕ has an infinite number of zeroes in any closed, bounded interval [a′,b′]⊂(a,b), then ϕ(x)≡0 in (a,b).

ddx(p(x)dydx)+Q(x)y=p(x)y″+p′(x)y′+Q(x)y =0, a<x<b. (1)”