The image contains a mathematical expression for an integral, which reads: \[ \int \frac{\sin(x) \csc(x)}{\cos(\sin(x) + 5)} \, dx \] In this expression: - \(\sin(x)\) is the sine of \(x\). - \(\csc(x)\) is the cosecant of \(x\), which is the reciprocal of \(\sin(x)\). - \(\cos(\sin(x) + 5)\) is the cosine of the sum of \(\sin(x)\) and 5. - \(dx\) indicates the variable of integration is \(x\). This integral appears to involve trigonometric functions and could be part of a calculus or advanced mathematics topic.
The image contains a mathematical expression for an integral, which reads: \[ \int \frac{\sin(x) \csc(x)}{\cos(\sin(x) + 5)} \, dx \] In this expression: - \(\sin(x)\) is the sine of \(x\). - \(\csc(x)\) is the cosecant of \(x\), which is the reciprocal of \(\sin(x)\). - \(\cos(\sin(x) + 5)\) is the cosine of the sum of \(\sin(x)\) and 5. - \(dx\) indicates the variable of integration is \(x\). This integral appears to involve trigonometric functions and could be part of a calculus or advanced mathematics topic.
The image contains a mathematical expression for an integral, which reads: \[ \int \frac{\sin(x) \csc(x)}{\cos(\sin(x) + 5)} \, dx \] In this expression: - \(\sin(x)\) is the sine of \(x\). - \(\csc(x)\) is the cosecant of \(x\), which is the reciprocal of \(\sin(x)\). - \(\cos(\sin(x) + 5)\) is the cosine of the sum of \(\sin(x)\) and 5. - \(dx\) indicates the variable of integration is \(x\). This integral appears to involve trigonometric functions and could be part of a calculus or advanced mathematics topic.
Transcribed Image Text:The image contains a mathematical expression for an integral, which reads:
\[
\int \frac{\sin(x) \csc(x)}{\cos(\sin(x) + 5)} \, dx
\]
In this expression:
- \(\sin(x)\) is the sine of \(x\).
- \(\csc(x)\) is the cosecant of \(x\), which is the reciprocal of \(\sin(x)\).
- \(\cos(\sin(x) + 5)\) is the cosine of the sum of \(\sin(x)\) and 5.
- \(dx\) indicates the variable of integration is \(x\).
This integral appears to involve trigonometric functions and could be part of a calculus or advanced mathematics topic.
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
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![The image contains a mathematical expression for an integral, which reads:
\[
\int \frac{\sin(x) \csc(x)}{\cos(\sin(x) + 5)} \, dx
\]
In this expression:
- \(\sin(x)\) is the sine of \(x\).
- \(\csc(x)\) is the cosecant of \(x\), which is the reciprocal of \(\sin(x)\).
- \(\cos(\sin(x) + 5)\) is the cosine of the sum of \(\sin(x)\) and 5.
- \(dx\) indicates the variable of integration is \(x\).
This integral appears to involve trigonometric functions and could be part of a calculus or advanced mathematics topic.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fc7ce9bec-78de-4bf5-9baa-7d37f77b06d1%2Fa4289c37-84db-47dd-9a4e-c28585918c61%2F5my70u8.jpeg&w=3840&q=75)
