Physics
Grade-10
Easy
Question
When a light ray gets refracted through a glass slab, the incident ray is ____.
- Parallel to the emergent ray
- Is laterally displaced from the incident ray
- Coincides with the emergent ray during normal incidence
- All of the above
The correct answer is: All of the above
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When a light ray refracts through a triangular prism, it diverts its path through an angle of _____.
When a light ray refracts through a triangular prism, it diverts its path through an angle of _____.
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When a light ray refracts through a glass slab, the incident ray is ____ to the emergent ray.
When a light ray refracts through a glass slab, the incident ray is ____ to the emergent ray.
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_____ is a measure of amount of deviation of the incident ray from its usual path.
_____ is a measure of amount of deviation of the incident ray from its usual path.
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Red colored light bends ____ when passed through a prism, as compared to other colors.
Red colored light bends ____ when passed through a prism, as compared to other colors.
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When the refractive index of the prism is increased, the angle of deviation _____.
When the refractive index of the prism is increased, the angle of deviation _____.
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When the refractive index of the surrounding medium is decreased, the angle of deviation _____.
When the refractive index of the surrounding medium is decreased, the angle of deviation _____.
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Violet colored light bends ____ when passed through a prism, as compared to other colors.
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When a light ray refracts through a prism the incident ray is _____ to the emergent ray.
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A triangular glass prism has ____ rectangular faces.
A triangular glass prism has ____ rectangular faces.
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The angle between the rectangular faces of a prism is called the ____.
The angle between the rectangular faces of a prism is called the ____.
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The angle between the incident ray and the emergent ray when light gets refracted through a prism is called the _____.
The angle between the incident ray and the emergent ray when light gets refracted through a prism is called the _____.
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A triangular glass prism has ____ triangular faces.
A triangular glass prism has ____ triangular faces.
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Light refracts when it falls on _____ surface.
Light refracts when it falls on _____ surface.
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Match the following:
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)
Match the following:
![](data:image/png;base64,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)
BiologyGrade-10
Biology
What is a change in an organism that allows for it to survive in its environment?
What is a change in an organism that allows for it to survive in its environment?
BiologyGrade-10