STATEMENT 1: Tangents at two distinct points of a cubic polynomial cannot coincide STATEMENT 2: If P — AITS & Test Series Chemistry Question

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STATEMENT 1: Tangents at two distinct points of a cubic polynomial cannot coincide STATEMENT 2: If P(x) is a polynomial of degree n (n  2), then P(x) = k cannot hold for n or more distinct values of x (A) Both the statements are true and Statement 2 is correct explanation of Statement 1. (B) Both the Statements are true and Statement 2 is not the correct explanation of Statement 1. (C) Statement 1 is true and Statement 2 is false. (D) Statement 1 is false and Statement 2 is true. Comprehension Type This section contains 3 groups of questions. Each group has 3 multiple choice question based on a paragraph. Each question has 4 choices (A), (B), (C) and (D) for its answer, out of which ONLY ONE is correct. Paragraph for Question Nos. 15 to 17 Read the following write up carefully and answer the following questions: A circle C whose radius is 1 unit, touches the x axis at point A. The centre Q of C lies in first quadrant. The tangent from origin O to the circle touches it at T and a point P lies on it such that OAP is a right angled triangle at A and its perimeter is 8 units