Statement-1 (A): When a die is rolled, the probability of getting a number which is a multiple of 3 and 5 both is zero. Statement-2 (R): The probability of an impossible event is zero.

A. Statement-1 is true, Statement-2 is true; Statement-2 is a correct explanation for Statement-1.

Statement-1 (A): When a die is rolled, the probability of getting…

Directions : In the following questions, the Assertions $(A)$ and Reason $(s) \ (R)$ have been put forward. Read both the statements carefully and choose the correct alternative from the following:
Assertion : $\sqrt{5}$ is an irrational no.
Reason : The square root of every positive integer is always irraational.

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Statement-1 (A): For $0<\theta \leq 90^{\circ}, \sin \theta+\operatorname{cosec} \theta \geq 2$.
Statement-2 (R): $\quad x+\frac{1}{x} \geq 2$ for all $x>0$.

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Statement A (Assertion) : In $\triangle P Q R$, right angled at $Q, Q R=3 cm , P R=5 cm$ and $P Q=$ $4 cm$. The value of $\sin ^2 R+\operatorname{cosec} R$ is $\frac{189}{100}$.

Statement $R$ (Reason) : $\sin ^2 A=(\sin A)^2$ and cosec $A=(\operatorname{scc} A)^{-1}$.

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Directions : In the following questions, a statement of assertion $(A)$ is followed by a statement of reason $(R).$ Mark the correct choice as:
Assertion : If the areas of three adjacent faces of a cuboid are $x, y, z$ respectively then the volume of the cuboid is $\sqrt{\text{xyz}}$
Reason : Volume of a cuboid whose edges are $l, b$ and $h$ is lbh units.

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Directions : In the following questions, the Assertions $(A)$ and Reason $(s) \ (R)$ have been put forward. Read both the statements carefully and choose the correct alternative from the following:
Assertion : If set $B = { 0, 1, 2, 3,.......}$ is given then it represent whole number.
Reason : Whole number is always start from zero.

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Assertion (A): A sphere of radius 7 cm is m ounted on the solid cone of radius 6 cm and height 8 cm . the volume of the combined solid is $1737.47 cm^3$. [Take $\pi=3.14$ ]

Reason (R): Volume of sphere and surface area of cone is given by $\frac{4}{3} \pi r^3$ and $\frac{1}{3} \pi r^2 h$ respectively.

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Statement-1 (A): If $a+b+c=0$, then the centroid of the triangle whose vertices are $P(a, b)$, $Q(b, c)$ and $R(c, a)$ is at the origin.
Statement-2 (R) : The coordinates of the centroid of the triangle whose vertices are
$
A\left(x_1, y_1\right), B\left(x_2, y_2\right) \text { and } C\left(x_3, y_3\right) \text { are }\left(\frac{x_1+x_2+x_3}{3}, \frac{y_1+y_2+y_3}{3}\right) \text {. }
$

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Assertion (A): $\sqrt{3}, 2 \sqrt{3}, 3 \sqrt{3}, 4 \sqrt{3}$ this series forms an A.P.
Reason (R): Since common difference is same and equal to $\sqrt{3}$ therefore given series is an AP.

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Directions : In the following questions, the Assertions $(A)$ and Reason $(s) \ (R)$ have been put forward. Read both the statements carefully and choose the correct alternative from the following:
Assertion : Arithmetic between $8$ and $12$ is $10.$
Reason : Arithmetic between two numbers $'a\ ’$ and $'b\ '$ is given as $\frac{\text{a}+\text{b}}{2}.$

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Statement-1 (A) : If zeroes of the polynomial $f(x)=5 x^2-11 x-(k-3)$ are reciprocal of each other, then $k=-2$.
Statement-2 (R) : The product of the zeroes of the polynomial $a x^2+b x+c$ is $-\frac{c}{a}$.

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Probability — Maths STD 10 — Question

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