Can someone help me solve the answer\n\nProblem:\n\nYou are given n intervals which are termed as special intervals. Each interval is of a different type.\n\nAgain, you are given a set of q non-special intervals. For each non-special interval in the given q intervals, you have to find the number of different types of special intervals in that non-special interval.\n\nNote: A special interval is inside a non-special interval if there exists a point x which belongs to both special interval and non-special interval.\n\nInput format\n\nFirst line: n denoting the number of special intervals\n\nNext n lines: Two integers denoting lspecial[i] and rspecial[i] denoting the range [l,r] for the ith special interval.\n\nNext line: q denoting the number of non-special intervals\n\nNext q lines: Two integers denoting lnonspecial[i] and rnonspecial[i] denoting the range [l,r] for the ith non-special interval.\n\nOutput format\n\nprint q space-seperated integers denoting the answer for each of the q non-special integers.\n\nConstraints\n\n1<=n<=10^5\n\n-10^9<=lspecial[i]<=10^9\n\n-10^9<=rspecial[i]<=10^9\n\n1<=q<= 5 * 10^4\n\n-10^9<=lnonspecial[i]<=10^9\n\n-10^9<=rnonspecial[i]<=10^9\n\nSample Input\n\n3\n\n1 2\n\n1 5\n\n1 7\n\n3\n\n1 3\n\n3 3\n\n6 7\n\nSample Output\n\n3 2 1

Can someone help me solve the answer\n\nProblem:\n\nYou are given n intervals which are termed as special intervals. Each interval is of a different type.\n\nAg