Statement-1 (A): A number is selected from the numbers 1, 2, 3, ..., 10. The probability that it is a root of the equationx^2-2 x+1=0 is 1 5 . Statement-2 (R): The equation x^2-2 x+1=0 has two roots

D. Statement-1 is false, Statement-2 is true.

Statement-1 (A): A number is selected from the numbers 1, 2, 3, .…

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: $m^2 - m$ is divisible by $2$ for every positive integers.
Reason: $\sqrt{2}$ is rational no.

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Statement A (Assertion) : The distance of the point $(2,11)$ from the $x$-axis is 11 units.
Statement R (Reason) : The distance of a point $(x, y)$ from $x$-axis is its ordinate, i.e., $y$ units.

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Assertion (A): The sum of the series with the $n$th term. $t_n=(9-5 n)$ is (465), when no. of terms $n=15$.
Reason (R): Given series is in A.P. and sum of n terms of an A.P. is $S _{ n }=\frac{n}{2}[2 a+(n-1) d]$

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Statement-1 (A): $ A B C D$ is a trapezium with $D C \| A B, E$ and $F$ are points on $A D$ and $B C$ respectively, such that $E F \| A B$. Then, $\frac{A E}{E D}=\frac{B F}{F C}$.
Statement-2 (R): Any line parallel to parallel sides of a trapezium divides the non-parallel sides proportionally.

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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 : In quadrilateral $\text{ABCD},$ if $AB = BC = CD = DA$ and $\text{AC = BD},$ then $\text{ABCD}$ is a square.
Reason : A quadrilateral is a square if all its sides are equal and the diagonals are equal.

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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 $(A) : (2 x-1)^2-4 x^2+5=0$ ota quadratic equation.
Reason $(R) : x=0,3$ are the roots of the equation $2 x^2-6 x=0$.

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Statement A (Assertion) : A ladder $16 m$ long just reaches the top of a vertical wall. If the ladder makes an angle of $60^{\circ}$ with the wall, then the height of the wall is $8 m$.
Statement R (Reason): The value of $\sin 60^{\circ}=\frac{\sqrt{3}}{2}$.

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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 : The value of $\text{q}=\pm2$, if $x = 3, y=1$ is the solution of the line $2x + y - q^2 - 3 = 0.$
Reason : The solution of the line will satisfy the equation of the line.

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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: Product of the zeroes of $-2x^2 + kx + 6$. is $-3.$
Reason: Product of zeroes $ =\frac{\text{c}}{\text{a}}.$

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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 $\text{TP}$ and $\text{TQ}$ are the two tangents to a circle with centre $\text{O}$ so that $\angle\text{POQ} = 123^\circ$, then $\angle\text{PTQ} = 57^\circ$
Reason : The tangent at any point of a circle is perpendicular to the radius through the point of contact.

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