[ 2^ 2020 +1 2^ 2018 +1 ]+ [ 3^ 2020 +1 3^ 2018 +1 ]+ [ 4^ 2020 +1 4^ 2018 +1 ] + [ 5^ 2020 +1 5^ 2018 +1 ] + [ 6^ 2020 +1 6^ 2018 +1 ] is

[ 2^ 2020 +1 2^ 2018 +1 ]+ [ 3^ 2020 +1 3^ 2018 +1 ]+ [ 4^ 2020 +…

If $\left| {z - 3 + 2i} \right| \leq 4$ then the difference between the greatest value and the least value of $\left| z \right|$ is

→

The system of equations $\begin{array}{l}\alpha x + y + z = \alpha - 1\\x + \alpha y + z = \alpha - 1\\x + y + \alpha z = \alpha - 1\end{array}$ has no solution, if $\alpha $ is

→

The sides of a right angled triangle are in arithmetic progression. If the triangle has area $24$ , then what is the length of its smallest side ?

→

If the projections of a line segment on the $x, y$ and $z-$ axes in $3-$ dimensional space are $2, 3$ and $6$ respectively, then the length of the line segment is

→

The order of the differential equation ${{{y\left( \frac{dy}{dx} \right)=x}/{\frac{dy}{dx}+\left( \frac{dy}{dx} \right)}\;}^{3}}$ is

→

The points of extremum of $\int_0^{{x^2}} {\frac{{{t^2} - 5t + 4}}{{2 + {e^t}}}} \,dt$ are

→

If the integers from $1$ to $2021$ are written as a single integer like $123 \ldots 91011 \ldots 20202021$, then the $2021st$ digit (counted from the left) in the resulting number is

→

Let $\overrightarrow{A}=i+j+k$ , $\overrightarrow B = i,\,\overrightarrow C = {C_1}i + {C_2}j + {C_3}k$. If ${C_2} = - 1$, and ${C_3} = 1$, then to make three vectors coplanar

→

The area the of tangent the of region the bounded parabola $(y-2)^2=x-1$ the tangent of the parabola at the point $(2,3)$ and the $x-$ axis is :

→

If $\sin \left( {x + \frac{{4\pi }}{9}} \right) = a;\,$ $\frac{\pi }{9}\, < \,x\, < \,\frac{\pi }{3},$ then $\cos \left( {x + \frac{{7\pi }}{9}} \right)$ equals :-

→

Answer

Need a full question paper?

Explore more

Similar questions

STD 11 - 8. sequence and series — JEE STD 11 Science — Question

Answer

Need a full question paper?

Explore more

Similar questions