JEE Main 2020 (Online) 6th September Morning Slot | Complex Numbers Question 98 | Mathematics

The region represented by
{z = x + iy $$ \in $$ C : |z| – Re(z) $$ \le $$ 1} is also given by the
inequality : {z = x + iy $$ \in $$ C : |z| – Re(z) $$ \le $$ 1}

y² $$ \le $$ $$2\left( {x + {1 \over 2}} \right)$$

y² $$ \le $$ $${x + {1 \over 2}}$$

y² $$ \ge $$ 2(x + 1)

y² $$ \ge $$ x + 1

JEE Main 2020 (Online) 5th September Evening Slot

MCQ (Single Correct Answer)

-1

The value of $${\left( {{{ - 1 + i\sqrt 3 } \over {1 - i}}} \right)^{30}}$$ is :

–2¹⁵i

–2¹⁵

2¹⁵i

6⁵

JEE Main 2020 (Online) 5th September Morning Slot

MCQ (Single Correct Answer)

-1

If the four complex numbers $$z,\overline z ,\overline z - 2{\mathop{\rm Re}\nolimits} \left( {\overline z } \right)$$ and $$z-2Re(z)$$ represent the vertices of a square of side 4 units in the Argand plane, then $$|z|$$ is equal to :

4$$\sqrt 2 $$

2$$\sqrt 2 $$

JEE Main 2020 (Online) 4th September Evening Slot

MCQ (Single Correct Answer)

-1

If a and b are real numbers such that
$${\left( {2 + \alpha } \right)^4} = a + b\alpha $$
where $$\alpha = {{ - 1 + i\sqrt 3 } \over 2}$$ then a + b is equal to :