Find the correct options which satisfy the wave equation: (a) y ( x,t ) =k ( x+vt ) 3 (b) y ( x,t ) =Ae ik ( x-vt ) (c) y ( x,t ) =ln [ k ( x-vt ) ]

Question

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Answer 1

Question

Chapter 15, Problem 36P

To determine

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]

Expert Solution & Answer

Answer to Problem 36P

Option (a), (b) and (c) are correct as it satisfies the general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Explanation of Solution

Given:

Equation:

y(x,t)=k(x+vt)3 .
y(x,t)=Aeik(x-vt)
y(x,t)=ln[k(x-vt)]

Calculation:

To show the given function satisfies the wave equation.

The wave equation:

∂2y∂x2=(1v2)∂2y∂t2

So, initially need to find their first and second derivatives with respect to x and

t and then substitute these derivatives in the wave equation.

The first two spatial derivatives of y(x,t)=k(x+vt)3 ,

∂y∂x=3k(x+vt)2

And

∂2y∂x2=6k(x+vt) …….(1)

Now, first two temporal derivatives of y(x,t)=k(x+vt)3 ,

∂y∂t=3kv(x+vt)2

And

∂2y∂t2=6kv2(x+vt) ……(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =6k( x+vt) 6kv2( x+vt) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, option (a) is correct answer as it is confirming that y(x,t)=k(x+vt)3 satisfies the general wave equation.

Option (b) is correct answer as it is confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Reason:

Find the first two spatial derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂x=ikAeik(x-vt) , ∂2y∂x2=i2k2Aeik(x-vt)

Or

∂2y∂x2=-k2Aeik(x-vt) ……(1).

Now, first two temporal derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂t=-ikvAeik(x-vt) , ∂2y∂t2=i2k2Aeik(x-vt)

Or ∂2y∂t2=-k2v2Aeik(x-vt) ……(2).

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = -k2 Ae ik( x-vt ) -k2v2 Ae ik( x-vt ) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Option (c) is correct answer as it is confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Reason:

first two spatial derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂x=kx-vt , ∂2y∂x2=k2( x-vt)2 …….(1)

Now, first two temporal derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂t=vkx-vt , ∂2y∂t2=v2k2( x-vt)2 …….(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = k 2 ( x-vt ) 2 v 2 k 2 ( x-vt ) 2 ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Conclusion:

Thus, all three options satisfy the given general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

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Answer 2

Question

Chapter 15, Problem 36P

To determine

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]

Expert Solution & Answer

Answer to Problem 36P

Option (a), (b) and (c) are correct as it satisfies the general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Explanation of Solution

Given:

Equation:

y(x,t)=k(x+vt)3 .
y(x,t)=Aeik(x-vt)
y(x,t)=ln[k(x-vt)]

Calculation:

To show the given function satisfies the wave equation.

The wave equation:

∂2y∂x2=(1v2)∂2y∂t2

So, initially need to find their first and second derivatives with respect to x and

t and then substitute these derivatives in the wave equation.

The first two spatial derivatives of y(x,t)=k(x+vt)3 ,

∂y∂x=3k(x+vt)2

And

∂2y∂x2=6k(x+vt) …….(1)

Now, first two temporal derivatives of y(x,t)=k(x+vt)3 ,

∂y∂t=3kv(x+vt)2

And

∂2y∂t2=6kv2(x+vt) ……(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =6k( x+vt) 6kv2( x+vt) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, option (a) is correct answer as it is confirming that y(x,t)=k(x+vt)3 satisfies the general wave equation.

Option (b) is correct answer as it is confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Reason:

Find the first two spatial derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂x=ikAeik(x-vt) , ∂2y∂x2=i2k2Aeik(x-vt)

Or

∂2y∂x2=-k2Aeik(x-vt) ……(1).

Now, first two temporal derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂t=-ikvAeik(x-vt) , ∂2y∂t2=i2k2Aeik(x-vt)

Or ∂2y∂t2=-k2v2Aeik(x-vt) ……(2).

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = -k2 Ae ik( x-vt ) -k2v2 Ae ik( x-vt ) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Option (c) is correct answer as it is confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Reason:

first two spatial derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂x=kx-vt , ∂2y∂x2=k2( x-vt)2 …….(1)

Now, first two temporal derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂t=vkx-vt , ∂2y∂t2=v2k2( x-vt)2 …….(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = k 2 ( x-vt ) 2 v 2 k 2 ( x-vt ) 2 ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Conclusion:

Thus, all three options satisfy the given general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

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Answer 3

Question

Chapter 15, Problem 36P

To determine

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]

Expert Solution & Answer

Answer to Problem 36P

Option (a), (b) and (c) are correct as it satisfies the general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Explanation of Solution

Given:

Equation:

y(x,t)=k(x+vt)3 .
y(x,t)=Aeik(x-vt)
y(x,t)=ln[k(x-vt)]

Calculation:

To show the given function satisfies the wave equation.

The wave equation:

∂2y∂x2=(1v2)∂2y∂t2

So, initially need to find their first and second derivatives with respect to x and

t and then substitute these derivatives in the wave equation.

The first two spatial derivatives of y(x,t)=k(x+vt)3 ,

∂y∂x=3k(x+vt)2

And

∂2y∂x2=6k(x+vt) …….(1)

Now, first two temporal derivatives of y(x,t)=k(x+vt)3 ,

∂y∂t=3kv(x+vt)2

And

∂2y∂t2=6kv2(x+vt) ……(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =6k( x+vt) 6kv2( x+vt) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, option (a) is correct answer as it is confirming that y(x,t)=k(x+vt)3 satisfies the general wave equation.

Option (b) is correct answer as it is confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Reason:

Find the first two spatial derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂x=ikAeik(x-vt) , ∂2y∂x2=i2k2Aeik(x-vt)

Or

∂2y∂x2=-k2Aeik(x-vt) ……(1).

Now, first two temporal derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂t=-ikvAeik(x-vt) , ∂2y∂t2=i2k2Aeik(x-vt)

Or ∂2y∂t2=-k2v2Aeik(x-vt) ……(2).

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = -k2 Ae ik( x-vt ) -k2v2 Ae ik( x-vt ) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Option (c) is correct answer as it is confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Reason:

first two spatial derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂x=kx-vt , ∂2y∂x2=k2( x-vt)2 …….(1)

Now, first two temporal derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂t=vkx-vt , ∂2y∂t2=v2k2( x-vt)2 …….(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = k 2 ( x-vt ) 2 v 2 k 2 ( x-vt ) 2 ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Conclusion:

Thus, all three options satisfy the given general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

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Answer 4

Question

Chapter 15, Problem 36P

To determine

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]

Expert Solution & Answer

Answer to Problem 36P

Option (a), (b) and (c) are correct as it satisfies the general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Explanation of Solution

Given:

Equation:

y(x,t)=k(x+vt)3 .
y(x,t)=Aeik(x-vt)
y(x,t)=ln[k(x-vt)]

Calculation:

To show the given function satisfies the wave equation.

The wave equation:

∂2y∂x2=(1v2)∂2y∂t2

So, initially need to find their first and second derivatives with respect to x and

t and then substitute these derivatives in the wave equation.

The first two spatial derivatives of y(x,t)=k(x+vt)3 ,

∂y∂x=3k(x+vt)2

And

∂2y∂x2=6k(x+vt) …….(1)

Now, first two temporal derivatives of y(x,t)=k(x+vt)3 ,

∂y∂t=3kv(x+vt)2

And

∂2y∂t2=6kv2(x+vt) ……(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =6k( x+vt) 6kv2( x+vt) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, option (a) is correct answer as it is confirming that y(x,t)=k(x+vt)3 satisfies the general wave equation.

Option (b) is correct answer as it is confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Reason:

Find the first two spatial derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂x=ikAeik(x-vt) , ∂2y∂x2=i2k2Aeik(x-vt)

Or

∂2y∂x2=-k2Aeik(x-vt) ……(1).

Now, first two temporal derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂t=-ikvAeik(x-vt) , ∂2y∂t2=i2k2Aeik(x-vt)

Or ∂2y∂t2=-k2v2Aeik(x-vt) ……(2).

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = -k2 Ae ik( x-vt ) -k2v2 Ae ik( x-vt ) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Option (c) is correct answer as it is confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Reason:

first two spatial derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂x=kx-vt , ∂2y∂x2=k2( x-vt)2 …….(1)

Now, first two temporal derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂t=vkx-vt , ∂2y∂t2=v2k2( x-vt)2 …….(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = k 2 ( x-vt ) 2 v 2 k 2 ( x-vt ) 2 ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Conclusion:

Thus, all three options satisfy the given general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

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Answer 5

Chapter 15, Problem 36P

To determine

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]

Expert Solution & Answer

Answer to Problem 36P

Option (a), (b) and (c) are correct as it satisfies the general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Explanation of Solution

Given:

Equation:

y(x,t)=k(x+vt)3 .
y(x,t)=Aeik(x-vt)
y(x,t)=ln[k(x-vt)]

Calculation:

To show the given function satisfies the wave equation.

The wave equation:

∂2y∂x2=(1v2)∂2y∂t2

So, initially need to find their first and second derivatives with respect to x and

t and then substitute these derivatives in the wave equation.

The first two spatial derivatives of y(x,t)=k(x+vt)3 ,

∂y∂x=3k(x+vt)2

And

∂2y∂x2=6k(x+vt) …….(1)

Now, first two temporal derivatives of y(x,t)=k(x+vt)3 ,

∂y∂t=3kv(x+vt)2

And

∂2y∂t2=6kv2(x+vt) ……(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =6k( x+vt) 6kv2( x+vt) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, option (a) is correct answer as it is confirming that y(x,t)=k(x+vt)3 satisfies the general wave equation.

Option (b) is correct answer as it is confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Reason:

Find the first two spatial derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂x=ikAeik(x-vt) , ∂2y∂x2=i2k2Aeik(x-vt)

Or

∂2y∂x2=-k2Aeik(x-vt) ……(1).

Now, first two temporal derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂t=-ikvAeik(x-vt) , ∂2y∂t2=i2k2Aeik(x-vt)

Or ∂2y∂t2=-k2v2Aeik(x-vt) ……(2).

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = -k2 Ae ik( x-vt ) -k2v2 Ae ik( x-vt ) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Option (c) is correct answer as it is confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Reason:

first two spatial derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂x=kx-vt , ∂2y∂x2=k2( x-vt)2 …….(1)

Now, first two temporal derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂t=vkx-vt , ∂2y∂t2=v2k2( x-vt)2 …….(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = k 2 ( x-vt ) 2 v 2 k 2 ( x-vt ) 2 ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Conclusion:

Thus, all three options satisfy the given general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Answer 6

Chapter 15, Problem 36P

To determine

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]

Expert Solution & Answer

Answer to Problem 36P

Option (a), (b) and (c) are correct as it satisfies the general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Explanation of Solution

Given:

Equation:

y(x,t)=k(x+vt)3 .
y(x,t)=Aeik(x-vt)
y(x,t)=ln[k(x-vt)]

Calculation:

To show the given function satisfies the wave equation.

The wave equation:

∂2y∂x2=(1v2)∂2y∂t2

So, initially need to find their first and second derivatives with respect to x and

t and then substitute these derivatives in the wave equation.

The first two spatial derivatives of y(x,t)=k(x+vt)3 ,

∂y∂x=3k(x+vt)2

And

∂2y∂x2=6k(x+vt) …….(1)

Now, first two temporal derivatives of y(x,t)=k(x+vt)3 ,

∂y∂t=3kv(x+vt)2

And

∂2y∂t2=6kv2(x+vt) ……(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =6k( x+vt) 6kv2( x+vt) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, option (a) is correct answer as it is confirming that y(x,t)=k(x+vt)3 satisfies the general wave equation.

Option (b) is correct answer as it is confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Reason:

Find the first two spatial derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂x=ikAeik(x-vt) , ∂2y∂x2=i2k2Aeik(x-vt)

Or

∂2y∂x2=-k2Aeik(x-vt) ……(1).

Now, first two temporal derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂t=-ikvAeik(x-vt) , ∂2y∂t2=i2k2Aeik(x-vt)

Or ∂2y∂t2=-k2v2Aeik(x-vt) ……(2).

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = -k2 Ae ik( x-vt ) -k2v2 Ae ik( x-vt ) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Option (c) is correct answer as it is confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Reason:

first two spatial derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂x=kx-vt , ∂2y∂x2=k2( x-vt)2 …….(1)

Now, first two temporal derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂t=vkx-vt , ∂2y∂t2=v2k2( x-vt)2 …….(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = k 2 ( x-vt ) 2 v 2 k 2 ( x-vt ) 2 ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Conclusion:

Thus, all three options satisfy the given general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Answer 7

Chapter 15, Problem 36P

To determine

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]

Answer 8

Expert Solution & Answer

Answer to Problem 36P

Option (a), (b) and (c) are correct as it satisfies the general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Given:

Equation:

y(x,t)=k(x+vt)3 .
y(x,t)=Aeik(x-vt)
y(x,t)=ln[k(x-vt)]

Calculation:

To show the given function satisfies the wave equation.

The wave equation:

∂2y∂x2=(1v2)∂2y∂t2

So, initially need to find their first and second derivatives with respect to x and

t and then substitute these derivatives in the wave equation.

The first two spatial derivatives of y(x,t)=k(x+vt)3 ,

∂y∂x=3k(x+vt)2

And

∂2y∂x2=6k(x+vt) …….(1)

Now, first two temporal derivatives of y(x,t)=k(x+vt)3 ,

∂y∂t=3kv(x+vt)2

And

∂2y∂t2=6kv2(x+vt) ……(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =6k( x+vt) 6kv2( x+vt) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, option (a) is correct answer as it is confirming that y(x,t)=k(x+vt)3 satisfies the general wave equation.

Option (b) is correct answer as it is confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Reason:

Find the first two spatial derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂x=ikAeik(x-vt) , ∂2y∂x2=i2k2Aeik(x-vt)

Or

∂2y∂x2=-k2Aeik(x-vt) ……(1).

Now, first two temporal derivatives of y(x,t)=Aeik(x-vt) ,

∂y∂t=-ikvAeik(x-vt) , ∂2y∂t2=i2k2Aeik(x-vt)

Or ∂2y∂t2=-k2v2Aeik(x-vt) ……(2).

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = -k2 Ae ik( x-vt ) -k2v2 Ae ik( x-vt ) ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=Aeik(x-vt) satisfies the general wave equation.

Option (c) is correct answer as it is confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Reason:

first two spatial derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂x=kx-vt , ∂2y∂x2=k2( x-vt)2 …….(1)

Now, first two temporal derivatives of y(x,t)=ln[k(x-vt)] ,

∂y∂t=vkx-vt , ∂2y∂t2=v2k2( x-vt)2 …….(2)

The ratio of the equation (1) to equation (2) is,

∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 = k 2 ( x-vt ) 2 v 2 k 2 ( x-vt ) 2 ∂ 2 y ∂ x 2 ∂ 2 y ∂ t 2 =1v2

Thus, confirming that y(x,t)=ln[k(x-vt)] satisfies the general wave equation.

Conclusion:

Thus, all three options satisfy the given general wave equation that is ∂2y/∂x2∂2y/∂t2=1v2 .

Answer 12

Ch. 15 - Prob. 1P Ch. 15 - Prob. 2P Ch. 15 - Prob. 3P Ch. 15 - Prob. 4P Ch. 15 - Prob. 5P Ch. 15 - Prob. 6P Ch. 15 - Prob. 7P Ch. 15 - Prob. 8P Ch. 15 - Prob. 9P Ch. 15 - Prob. 10P

Find the correct options which satisfy the wave equation: (a) y ( x,t ) =k ( x+vt ) 3 (b) y ( x,t ) =Ae ik ( x-vt ) (c) y ( x,t ) =ln [ k ( x-vt ) ]

Find the correct options which satisfy the wave equation: (a) y(x,t)=k(x+vt)3 (b) y(x,t)=Aeik(x-vt) (c) y(x,t)=ln[k(x-vt)]

Answer to Problem 36P

Explanation of Solution

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Chapter 15 Solutions

Find the correct options which satisfy the wave equation:

(a) y(x,t)=k(x+vt)3
(b) y(x,t)=Aeik(x-vt)

(c) y(x,t)=ln[k(x-vt)]