Physics
Grade-6
Easy
Question
In a medium, the wavelength of light is maximum for the color _________.
- Green
- Violet
- Indigo
- Red
Hint:
Red
The correct answer is: Red
red has maximum wavelength.
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)
In the CMY color model, if you mix all three colors, what is the color you get?
![](data:image/png;base64,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)
PhysicsGrade-6
Physics
Choose the correct increasing order of arrangement of the colors of light in a prism.
A. Red
B. Blue
C. Violet
D. Green
Choose the correct increasing order of arrangement of the colors of light in a prism.
A. Red
B. Blue
C. Violet
D. Green
PhysicsGrade-6
Physics
Violet-colored light bends ____ when passed through a prism, as compared to other colors.
Violet-colored light bends ____ when passed through a prism, as compared to other colors.
PhysicsGrade-6
Physics
In a medium, the wavelength of light is the minimum for the color _________.
In a medium, the wavelength of light is the minimum for the color _________.
PhysicsGrade-6
Physics
Why does a red rose look red in color?
Why does a red rose look red in color?
PhysicsGrade-6
Physics
The seven colors in the spectrum of sunlight, in order, are represented as
The seven colors in the spectrum of sunlight, in order, are represented as
PhysicsGrade-6
Physics
We see an object because
We see an object because
PhysicsGrade-6