Consider f(x) =x^3+ax^2+bx+c Parameters ...

Consider `f(x) =x^3+ax^2+bx+c` Parameters `a, b, c` are chosen as the face value of a fair dice by throwing it three times Then the probability that `f(x)` is an invertible function is (A) `5/36` (B) `8/36` (C) `4/9` (D) `1/3`

Text Solution

AI Generated Solution

Similar Questions

Explore conceptually related problems

Suppose f(x)=x^(3)+ax^2+bx+c.a,b,c are chosen respectively by throwing a die three times. Find the probability that f(x) is an increasing function.

A function f is such that f(x)=x^3+ax^2+bx+c , where a, b, c are chosen by throwing a die three times. The probability that f is an increasing function is

Two fair dice are rolled together, one of the dice showing 4, then the probability that the other is showing 6 is 2/(11) (b) 1/8 (c) 1/6 (d) 1/(36)

The coefficients a,b and c of the quadratic equation, ax2+bx+c = 0 are obtained by throwing a dice three times. The probability that this equation has equal roots is:

The probability of throwing a number greater than 2 with a fair dice is 3/5 (b) 2/5 (c) 2/3 (d) 1/3

In a single throw a pair of dice, the probability of getting the sum a perfect square is (a) 1/(18) (b) 7/(36) (c) 1/6 (d) 2/9

The probability of throwing 16 in one throw with three dice is a) 1/36 b) 1/18 c)1/72 d)1/9

Two dice are thrown simultaneously. the probability of obtaining total score of seven is a. 5/36 b. 6/36 c. 7/36 d. 8/36

If three dice are throw simultaneously, then the probability of getting a score of 5 is a. 5/216 b. 1/6 c. 1/36 d. none of these

Consider that f(x) =ax^(2) + bx +c, D = b^(2)-4ac , then which of the following is not true ?

Consider `f(x) =x^3+ax^2+bx+c` Parameters `a, b, c` are chosen as the face value of a fair dice by throwing it three times Then the probability that `f(x)` is an invertible function is (A) `5/36` (B) `8/36` (C) `4/9` (D) `1/3`

Text Solution

Similar Questions

Recommended Questions