The first post to be eliminated by integrated area-wide approach using sterile insect technique ____

Sterilization refers to the wide range of methods done to overcome microbes. Considering this statement, how the laminar air flow chamber is sterilized to carry out inoculation process in plant tissue culture technique.

Using the method of integration find the area bounded by the curve |x| + |y| = 1 .

Find the Area of the triangle whose vertices are given (a) . By using integration . (b) by using Heron's formula ( c) by using determinants The result obtained in (a), (b) and ( c) are equal . Why ?

(i) Find the points of intersection of the parabola y ^(2) = 8x and the line y = 2x . (ii) Find, using integration, the area enclosed between the line and the parabola.

Consider the circle x^(2) + y^(2) = 16 and the straight line y = sqrt3x as shown in the figure. (i)Find the points A and B as shown in the figure. (ii) Find the area of the shaded region in the figure using definite integral.

Read the following statements and select the correct ones. (i) Electrophoresis is a technique used for the separation of molecules based on their size and charge. (ii) Plasmids are extra-chromosomal, self-replicating, usually circular, double stranded DNA molecules found naturally in many bacteria and also in some yeast,. (iii) It is not advisable to use an exonuclease enzyme while producing a recombinant DNA molecule. (iv) In EcoRl, the roman numberal I indicates that it was the first enzyme isolated from E.coli A) (i) and (ii) B) (iii) and (iv) C) (i),(ii) and (iv) D) (i),(ii),(iii) and (iv)

Assertion : Integrated pest management (IPM) programme at the same time deals with conservation of insects and destruction of insects. Reason : IPM programmes are specially used in dealing with ecologically sensitive areas.

(i) Draw a rough sketch of the curve y^(2) = x and shade the region bounded by the line x = 1 and the curve. (ii) Using integration find the area of the shaded region.

On a graph paper, draw the graphs of the curves y = 4 x^(2) and x = 4 y^(2) . Calculate the area between them from the graph by counting squares. (ii) Using integration, find the area between the above two curves. (Compare (i) & (ii) )

Find the area of the circle x^(2) + y^(2) = 4 using integration.