Choose the correct alternative answer for the following question. 1 + tan^2 = ? A. cot^2 B. cosec^2 C. sec^2 D. tan^2

We know that, 1 + tan^2 = sec^2

Choose the correct alternative answer for the following question.…

Four alternative answers for each of the following questions are given. Choose the correct alternative.
Seg XZ is a diameter of a circle. Point Y lies in its interior. How many of the following statements are true?
(i) It is not possible that ∠XYZ is an acute angle.
(ii) ∠ XYZ can’t be a right angle.
(iii) ∠ XYZ is an obtuse angle.
(iv) Can’t make a definite statement for measure of ∠ XYZ.
A. Only one
B. Only two
C. Only three
D. All

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if $\text{u}_\text{i}=\frac{\text{x}_\text{i}-25}{10}\sum\text{f}_\text{i}\text{u}_\text{i}=20,\sum\text{f}_\text{i}=100,$ then $\bar{\text{x}}$

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The area of the largest triangle that can be inscribed in a semi$-$circle of radius $r,$ is:

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$\frac{\tan\theta}{\sec\theta-1}+\frac{\tan\theta}{\sec\theta + 1}$ is equal to:

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The diameter of a cylinder is $28\ cm$ and its height is $20\ cm$. The total surface area of the cylinder is:

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If two positive integers $tn$ and $n$ arc expressible in the form $m = pq^3$ and $n = p^3q^2,$ where $p, q$ are prime numbers, then $\text{HCF} (m, n)$ =

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$\triangle\text{ABC}$ and $\triangle\text{BDE}$ are two equilateral triangles such that $D$ is the mid$-$point of $\text{BC.}$ The ratio of the areas of triangle $\text{ABC}$ and $\text{BDE}$ is:

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A metallic cylinder of radius $8 \ cm$ and height $2\ cm$ is melted and converted into a right circular cone of height $6\ cm. $The radius of the base of this cone is:

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$\frac{\sec30^\circ}{\text{cosec }60^\circ}=?$

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In $\triangle RST , \angle S =90^{\circ}, RT =12 m$, $ST =8 m$ then $RS =$ ______

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