I know that rotating body has centripetal acceleration that is directed to the center of rotation.
$$a_{cp}=-\frac{v^2}{R}$$ (Lets imagine that body is located at 12 o'clock and that Ox axis is pointed from center to 12 o'clock, $a_{cp}$ is directed from body to center of the circle).
I know that according to Newton's second law there should be force that equals $$F=ma_{cp},$$ so there should be Force $$F_{cp} =-m\frac{v^2}{R}.$$ But from daily experience we know that centrifugal force that there is centrifugal force that acts on point that is located at 12 o'clock and it is parallel to line connecting center and point and is directed outward.
$$F_{cf}=m \frac{v^2}{R}$$
Why force that acts on body is directed to direction that is opposite to centripetal acceleration? What is solution of seeming contradiction with Newton's second law?
P.S. I know calculus and I still can't understand this? I spent a lot of time trying to understand this. UPDATE:
1)Let me sum up most essential of the answer. There is a way to determine acceleration by mental experiment. Imagine that that there is hollow box inside the body. In the box there is other smaller body that is attache to the springs. By measuring displacement of smaller body we can measure acceleration. If body is accelerating to the right smaller body will go to the left of the center of hollow box. If body is accelerating to the left smaller body will go to the right of the center of hollow box. If body is attached to the rope and is rotating than smaller body will move to direction opposite of center of rotation, showing that force is directed to the center of rotation. Direction of acceleration is the same as direction of the force.
2)I got from the link, that centripetal force is the tension force of the rope. https://www.khanacademy.org/science/physics/centripetal-force-and-gravitation/centripetal-forces/v/centripetal-force-problem-solving
