IIT-JEE 2002 Screening | Quadratic Equation and Inequalities Question 34 | Mathematics

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IIT-JEE 2002 Screening

MCQ (Single Correct Answer)

-0.5

The set of all real numbers x for which $${x^2} - \left| {x + 2} \right| + x > 0$$, is

$$( - \infty ,\, - 2) \cup (2,\infty )$$

$$( - \infty ,\, - \sqrt 2 ) \cup (\sqrt 2 ,\infty )$$

$$( - \infty ,\, - 1) \cup (1,\infty )$$

$$(\sqrt 2 ,\infty )$$

IIT-JEE 2002 Screening

MCQ (Single Correct Answer)

-0.5

If $${a_1},{a_2}.......,{a_n}$$ are positive real numbers whose product is a fixed number c, then the minimum value of $${a_1} + {a_2} + ..... + {a_{n - 1}} + 2{a_n}$$ is

$$n{(2c)^{1/n}}$$

$$(n + 1){c^{1/n}}$$

$$2n{c^{1/n}}$$

$$(n + 1)\,{(2c)^{1/n}}$$

IIT-JEE 2000 Screening

MCQ (Single Correct Answer)

-0.5

For the equation $$3{x^2} + px + 3 = 0$$. p > 0, if one of the root is square of the other, then p is equal to

1/3

2/3

IIT-JEE 2000 Screening

MCQ (Single Correct Answer)

-0.5

If $$\alpha \,\text{and}\,\beta $$ $$(\alpha \, < \,\beta )$$ are the roots of the equation $${x^2} + bx + c = 0\,$$, where $$c < 0 < b$$, then

$$0 < \alpha \, < \,\beta \,$$

$$\alpha \, < \,0 < \beta \,<\left| \alpha \right|$$

$$\alpha \, < \beta \, < 0\,$$

$$\alpha \, < \,0 < \left| \alpha \right| < \beta $$

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