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AP EAPCET 2026
List of top Questions asked in AP EAPCET- 2026
If the distance of a variable point $P$ from the fixed line \[ 2x-y+1=0 \] is twice the distance of $P$ from another fixed line \[ 2x+y-2=0, \] then a point on the locus of $P$ is
AP EAPCET - 2026
AP EAPCET
Mathematics
Locus of Normals
When the origin is shifted to the point \[ \left(\frac74,-\frac14\right) \] by translation of axes, the transformed equation of \[ x^2-2xy+3y^2+2gx+2fy-6=0 \] is \[ 8X^2-16XY+24Y^2+k=0. \] Then \[ -27(2f+g)= \]
AP EAPCET - 2026
AP EAPCET
Mathematics
Rotation of Axes
Consider the random experiment of throwing a die and tossing a coin. Let \[ \{(a,b)\mid a\in\{H,T\},\ b\in\{1,2,\ldots,6\}\} \] denote the outcomes of the experiment. If $X$ is a random variable defined by \[ X(a,b)=b, \] then the variance of $X$ is
AP EAPCET - 2026
AP EAPCET
Mathematics
Probability Distribution
If $X\sim B(n,p)$ is a binomial variate, $8p^2+15p-2=0$ and the product of the mean and variance of $X$ is $\dfrac78$, then $P(X=4)=$
AP EAPCET - 2026
AP EAPCET
Mathematics
Probability Distribution
Let $A(1,2)$ and $C(3,4)$ be the end points of one of the diagonals of a square $ABCD$. If $B(\alpha,\beta)$ and $D(\gamma,\delta)$ are the end points of another diagonal of this square, then $\alpha+\beta-\gamma+\delta=$
AP EAPCET - 2026
AP EAPCET
Mathematics
Coordinate Geometry
The equation of a line $L_{1}$ passing through the point $(2, 4)$ and making an angle $\tan^{-1}(2)$ with another line $x+2y=4$ is $ax+by+c=0$. If this line $L_{1}$ is neither horizontal nor vertical, then $\frac{b+c}{a}=$
AP EAPCET - 2026
AP EAPCET
Mathematics
Coordinate Geometry
If five unit squares are selected at random from a chess board, then the probability that they all lie on a diagonal is
AP EAPCET - 2026
AP EAPCET
Mathematics
Probability
Let $A$ and $B$ be two non-empty sets with $n(A)=4$ and $n(B)=5$. If a mapping is selected at random from the set of all mappings from $A$ to $B$, then the probability of getting a many-one mapping is
AP EAPCET - 2026
AP EAPCET
Mathematics
Probability
Out of the first $20$ consecutive natural numbers, $3$ numbers are chosen at random. If these $3$ numbers are in arithmetic progression with common difference $d\in\mathbb N$, then the probability of getting those $3$ numbers whose common difference is a prime number is
AP EAPCET - 2026
AP EAPCET
Mathematics
Probability
Bag $A$ contains $3$ white and $4$ black balls. Bag $B$ contains $4$ white and $3$ black balls. Bag $C$ contains $2$ white and $5$ black balls. A bag is randomly selected and then a ball is randomly drawn from that bag. If the ball drawn was found to be white, then the probability that the ball is drawn from bag $C$ is
AP EAPCET - 2026
AP EAPCET
Mathematics
Probability
If $\vec a,\vec b,\vec c$ are $3$ vectors such that \[ \vec b=2\hat i-\hat j,\qquad \vec c=\hat j+2\hat k, \] \[ |\vec a+\vec b|=3,\qquad |\vec a\times(\vec b\times\vec c)|=3\sqrt2 \] and \[ (\vec a,\vec b\times\vec c)=\frac{\pi}{3}, \] then $\vec a\cdot\vec b=$
AP EAPCET - 2026
AP EAPCET
Mathematics
Geometry and Vectors
The mean deviation about the mean for the following data is \[ \begin{array}{c|cccc} x_i & 1 & 2 & 4 & 7\\ \hline f_i & 3 & 2 & 4 & 1 \end{array} \]
AP EAPCET - 2026
AP EAPCET
Mathematics
Measures of Dispersion
Let $\vec a,\vec b$ and $\vec c$ be three non-zero vectors such that no two of them are collinear. If the vector $\vec a+\vec b$ is collinear with $\vec c$ and $\vec b+\vec c$ is collinear with $\vec a$, then \[ \vec a+\vec b+\vec c= \]
AP EAPCET - 2026
AP EAPCET
Mathematics
Geometry and Vectors
Let \[ \vec a=4\hat i-\hat j+\alpha\hat k \] and \[ \vec b=\hat i+\alpha\hat j-4\hat k \] be two vectors. If $\alpha_1,\alpha_2$ ($\alpha_1<\alpha_2$) are two different values of $\alpha$ such that \[ (\vec a,\vec b)=\cos^{-1}\left(-\frac{2}{7}\right), \] then \[ \alpha_1+2\alpha_2= \]
AP EAPCET - 2026
AP EAPCET
Mathematics
Geometry and Vectors
The shortest distance between the two lines \[ \vec r=(\hat i-\hat j)+s(\hat j+2\hat k) \] and \[ \vec r=(2\hat i+\hat k)+t(\hat i-\hat j+\hat k) \] is
AP EAPCET - 2026
AP EAPCET
Mathematics
Shortest Distance Between Skew Lines
Assertion (A): If each of the angles $A,B,C$ is not a multiple of $\pi$, then the vectors \[ \vec r_1=(\sec^2A)\hat i+\hat j+\hat k, \] \[ \vec r_2=\hat i+(\sec^2B)\hat j+\hat k, \] \[ \vec r_3=\hat i+\hat j+(\sec^2C)\hat k \] are coplanar. Reason (R): The three vectors \[ \vec a=a_1\hat i+a_2\hat j+a_3\hat k, \] \[ \vec b=b_1\hat i+b_2\hat j+b_3\hat k, \] \[ \vec c=c_1\hat i+c_2\hat j+c_3\hat k \] are coplanar if and only if \[ \begin{vmatrix} a_1&a_2&a_3\\ b_1&b_2&b_3\\ c_1&c_2&c_3 \end{vmatrix}=0. \] Which of the following is true?
AP EAPCET - 2026
AP EAPCET
Mathematics
Geometry and Vectors
The sides of a triangle are in the ratio \[ 1:\sqrt3:2. \] Then the angles opposite to these sides are in the ratio
AP EAPCET - 2026
AP EAPCET
Mathematics
Some Properties of a Triangle
In a triangle $ABC$, $C=90^\circ$. If $r$ is the inradius and $R$ is the circumradius of the triangle, then \[ 2(r+R)= \]
AP EAPCET - 2026
AP EAPCET
Mathematics
Some Properties of a Triangle
If $\Delta$ denotes the area of triangle $ABC$ and $s$ is its semi-perimeter, then
AP EAPCET - 2026
AP EAPCET
Mathematics
Some Properties of a Triangle
Evaluate \[ \cos\frac{6\pi}{17}\cos\frac{10\pi}{17}\cos\frac{12\pi}{17}\cos\frac{14\pi}{17}. \]
AP EAPCET - 2026
AP EAPCET
Mathematics
Trigonometry
The number of distinct real roots of \[ \begin{vmatrix} \sin x & \cos x & \cos x\\ \cos x & \sin x & \cos x\\ \cos x & \cos x & \sin x \end{vmatrix}=0 \] in the interval \[ \left(-\frac{\pi}{4},\frac{\pi}{4}\right) \] is
AP EAPCET - 2026
AP EAPCET
Mathematics
Trigonometry
The value of \[ \tan81^\circ-\tan63^\circ-\tan27^\circ+\tan9^\circ \] is
AP EAPCET - 2026
AP EAPCET
Mathematics
Trigonometry
For $n\in\mathbb Z$, a set of values of $\theta$ satisfying \[ \sec\theta-1=(\sqrt2-1)\tan\theta \] is
AP EAPCET - 2026
AP EAPCET
Mathematics
Trigonometry
If \[ u=\log\tan\left(\frac{\pi}{4}+\frac{\theta}{2}\right), \] then \[ \tanh\frac{u}{2} = \]
AP EAPCET - 2026
AP EAPCET
Mathematics
Hyperbolic Functions
The number of real solutions of the equation \[ \tan^{-1}\sqrt{x(x+1)} + \sin^{-1}\sqrt{x^2+x+1} = \frac{\pi}{2} \] is
AP EAPCET - 2026
AP EAPCET
Mathematics
Trigonometry
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