null void said:
I was doing an experiment by putting a wooden block on a plane, then slowly lifting up the other side to make the plane incline more until the wooden block slip( when the force that the friction is opposing exceed the static friction). I know that when lifting up the plane, the N force getting smaller then the force perpendicular to the N will become bigger.
OK. Since you're finding the angle at which the block just begins to slip, the static friction at that point will equal μN, the maximum value. As you point out, the greater the angle of the incline, the smaller the value of that normal force.
In any case, should the angle at which the block just begins to slip depend on the mass of the block?
Right.
when the mass doubled, i suppose the friction also doubled.
Why do you think that? You're still pushing with only 1 N of force. (What changes is the
maximum value of the friction force, not the actual friction force.)
More examples. Two blocks on a horizontal table. One with a mass of 1 Kg and the other with a mass of 10 Kg. Let's say that μ = 0.5. So what is the maximum value of static friction in each case, which is given by μN = μmg?
For the 1 kg block: μmg = 4.9 N
For the 10 kg block: μmg = 49 N
So, if you push the 1 kg block with a horizontal force of 1 N, what will be the static friction created? (Hint: How does the 1 N force compare to the maximum value for the static friction?)
Same question for the 10 kg block.
So in conclusion the static friction does affected by mass?
See above.