In the given figure, \(ABCD\) is a rectangle with length \(10\,\text{cm}\) and breadth \(6\,\text{cm}\).
Write the formula for the area of a rectangle.[1]
Find the area of the rectangle.[1]
Find the perimeter of the rectangle.[1]
Find the value of \((3x)^0\).[1]
Simplify: \(x^2 \times x^3 \times x^{-2}\).[2]
Factorise: \(x^2 + 6x + 8\).[2]
Two equations are given below: \(2x + y = 8\) and \(x + y = 5\).
What is this system of equations called?[1]
Solve the equations using a graph.[2]
Find the L.C.M. of the algebraic expressions \(a^2 - b^2\) and \(a^2 - ab\).[2]
For what value of \(x\) does the expression \(x^2 - 5x + 6\) become zero?[2]
In the adjoining figure, line \(PQ\) intersects straight lines \(AB\) and \(CD\) at points \(E\) and \(F\) respectively.
Write a pair of alternate angles if \(AB \parallel CD\).[1]
Find the value of \(x\).[2]
At what value of \(\angle BEF\) will the lines \(AB\) and \(CD\) become parallel?[2]
Construct a rectangle \(ABCD\) where \(BC = 5\,\text{cm}\), \(BD = 10\,\text{cm}\), and \(\angle CBD = 60^\circ\).[3]
Find the value of \(x\) in the given figure.[3]
What type of triangles are required to form a regular tessellation?[2]
If the bearing of point \(A\) from point \(B\) is \(080^\circ\), find the bearing of point \(B\) from point \(A\).[2]
The vertices of \(\triangle PQR\) are \(P(1,3)\), \(Q(4,1)\), and \(R(3,5)\). Find the vertices of the image \(\triangle P'Q'R'\) after rotation through \(+90^\circ\) about the origin. Represent both triangles on the same graph.[3]
The monthly expenditure (in Rs.) of Ram’s family is given below:
Month
Baishakh
Jestha
Ashar
Shrawan
Expenditure (Rs.)
25,000
19,000
28,000
18,000
Present Ram’s family expenditure in a pie chart.[3]
In a data set, \(2x = m + 77\), \(n = 10\), and mean (\(\bar{x}\)) = \(8\). Find the value of \(m\).[2]
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