English-2
Grade-7
Easy
Question
Ans 1-They
Ans 2- That
Ans 3-It
Ans 4-These
Ans 5- himself
Ans 1- Ourselves
Ans 2- Either
Ans 1 (Somebody)- Indefinite Pronoun
Ans 2(Few)-Indefinite Pronoun
Ans 3(I)-Personal Pronoun
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English-2
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science
Rahim wants to skydive for the first time. Which of the following should he do to ensure a safe landing?
a) Deploy the parachute on time
b) Carry a pair of stylish goggles
c) Carry a helmet for safety
d) Wear a pair of sneakers
Rahim wants to skydive for the first time. Which of the following should he do to ensure a safe landing?
a) Deploy the parachute on time
b) Carry a pair of stylish goggles
c) Carry a helmet for safety
d) Wear a pair of sneakers
scienceGrade-7
science
What happens to the gravitational and the applied forces acting on a ball thrown up when it reaches the topmost point?
What happens to the gravitational and the applied forces acting on a ball thrown up when it reaches the topmost point?
scienceGrade-7
science
What forces are acting on a ball when it is thrown up until it reaches the topmost point? How are they aligned?
What forces are acting on a ball when it is thrown up until it reaches the topmost point? How are they aligned?
scienceGrade-7
science
When a skydiver deploys her parachute, she is under the action of ____.
When a skydiver deploys her parachute, she is under the action of ____.
scienceGrade-7
science
A truck is moving forward on the road and experiencing a frictional force of 203 N. The force applied by its engine is 743 N. Considering the air resistance to be negligible, calculate the force that the break needs to apply on it in order to stop it. In which direction should this force be applied?
A truck is moving forward on the road and experiencing a frictional force of 203 N. The force applied by its engine is 743 N. Considering the air resistance to be negligible, calculate the force that the break needs to apply on it in order to stop it. In which direction should this force be applied?
scienceGrade-7
science
A skydiver jumps from a high-flying helicopter. Which of the statements about him is true?
A skydiver jumps from a high-flying helicopter. Which of the statements about him is true?
scienceGrade-7
science
A car accelerating uniformly on the road comes across a rough road so that the frictional force increases sufficiently to balance out the forward force exerted by the engine. What would happen to the motion of the car?
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)
A car accelerating uniformly on the road comes across a rough road so that the frictional force increases sufficiently to balance out the forward force exerted by the engine. What would happen to the motion of the car?
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)
scienceGrade-7
science
A book lying on a table was pushed, and it moved. What kinds of forces were acting on the book when it was lying on the table and when it moved?
- Gravitational force is a non-contact force.
- Friction is a contact force.
- Reaction force due to table is a contact force.
- Contact force can be a push, full or friction.
A book lying on a table was pushed, and it moved. What kinds of forces were acting on the book when it was lying on the table and when it moved?
scienceGrade-7
- Gravitational force is a non-contact force.
- Friction is a contact force.
- Reaction force due to table is a contact force.
- Contact force can be a push, full or friction.
science
An avocado hangs from a branch of a tree. What kinds of forces are acting on it?
An avocado hangs from a branch of a tree. What kinds of forces are acting on it?
scienceGrade-7
science
An object is under the action of two forces that balance out each other. The forces are ____.
An object is under the action of two forces that balance out each other. The forces are ____.
scienceGrade-7
science
Vimal had a remote-control toy car, which had separate buttons to control its velocity and direction of motion. He wanted it to be under balanced forces. How should he use the remote for that?
A) He should not start the car or use the remote.
B) He should start the car and then keep on increasing its velocity uniformly
C) He should start the car and make it move in a circular path
D) He should start the car and fix its velocity at a certain value and fix its direction of motion.
- Centripetal acceleration is needed for circular motion. Means there will be net centripetal force also.
- Velocity is increasing means there is acceleration. And hence, there is net force.
Vimal had a remote-control toy car, which had separate buttons to control its velocity and direction of motion. He wanted it to be under balanced forces. How should he use the remote for that?
A) He should not start the car or use the remote.
B) He should start the car and then keep on increasing its velocity uniformly
C) He should start the car and make it move in a circular path
D) He should start the car and fix its velocity at a certain value and fix its direction of motion.
scienceGrade-7
- Centripetal acceleration is needed for circular motion. Means there will be net centripetal force also.
- Velocity is increasing means there is acceleration. And hence, there is net force.
science
A biker is moving on a circular track. What kind of forces are acting on him?
A biker is moving on a circular track. What kind of forces are acting on him?
scienceGrade-7
science
Pick the odd one out.
Pick the odd one out.
scienceGrade-7