Ответ:
Объяснение:
One way to solve this equation is to use the product-to-sum formula that states:
sin(a)sin(b) = (1/2)[cos(a-b)-cos(a+b)]
Using this formula, we can rewrite the left-hand side of the equation as:
sin(10x)sin(2x) = (1/2)[cos(10x-2x)-cos(10x+2x)] = (1/2)[cos(8x)-cos(12x)]
Similarly, the right-hand side of the equation becomes:
sin(8x)sin(4x) = (1/2)[cos(8x-4x)-cos(8x+4x)] = (1/2)[cos(4x)-cos(12x)]
Substituting these expressions back into the original equation, we get:
(1/2)[cos(8x)-cos(12x)] = (1/2)[cos(4x)-cos(12x)]
Simplifying and solving for cos(8x), we get:
cos(8x) = cos(4x)
Using the identity cos(a) = cos(-a), we can also write this as:
cos(8x-4x) = 1
Therefore, 8x-4x = 2πn, where n is an integer.
Solving for x, we get x = πn/2 + πm/4, where m and n are integers.
This means that the solutions to the original equation are all values of x that can be expressed in the form πn/2 + πm/4, where m and n are integers.
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Answers & Comments
Ответ:
Объяснение:
One way to solve this equation is to use the product-to-sum formula that states:
sin(a)sin(b) = (1/2)[cos(a-b)-cos(a+b)]
Using this formula, we can rewrite the left-hand side of the equation as:
sin(10x)sin(2x) = (1/2)[cos(10x-2x)-cos(10x+2x)] = (1/2)[cos(8x)-cos(12x)]
Similarly, the right-hand side of the equation becomes:
sin(8x)sin(4x) = (1/2)[cos(8x-4x)-cos(8x+4x)] = (1/2)[cos(4x)-cos(12x)]
Substituting these expressions back into the original equation, we get:
(1/2)[cos(8x)-cos(12x)] = (1/2)[cos(4x)-cos(12x)]
Simplifying and solving for cos(8x), we get:
cos(8x) = cos(4x)
Using the identity cos(a) = cos(-a), we can also write this as:
cos(8x-4x) = 1
Therefore, 8x-4x = 2πn, where n is an integer.
Solving for x, we get x = πn/2 + πm/4, where m and n are integers.
This means that the solutions to the original equation are all values of x that can be expressed in the form πn/2 + πm/4, where m and n are integers.
Ответ:
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