MCQ in English Application of Integrals Solutions for CBSE Maths 12 Science to enable students to get Solutions in a narrative video format for the specific question.
Expert Teacher provides MCQ Application of Integrals Solutions for CBSE Maths 12 Science through Video Solutions in English language. This video solution will be useful for students to understand how to write an answer in exam in order to score more marks. This teacher uses a narrative style for a question from Application of Integrals not only to explain the proper method of answering question, but deriving right answer too.
Please find the question below and view the Solution in a narrative video format.
Question:
Find the area of the region lying in the first quadrant and bounded by and y = 4.
Solution Video in English:
Question 1 : Using the method of integration, find the area of the region bounded by the lines 3x - 2y + 1 = 0, 2x + 3y -21 = 0 and x - 5y + 9 = 0. (View Answer Video)
Question 2 : Find the area enclosed by the parabola and the line 2y = 3x + 12. (View Answer Video)
Question 3 :
Find the area of the given curves and given lines:
and x-axis
Question 4 : Find the area of the given curves and given lines:
and x-axis (View Answer Video)
Question 5 : Find the area of the region . (View Answer Video)
Question 1 : The objective function is maximum or minimum, which lies on the boundary of the feasible region. (View Answer Video)
Question 1 : Obtain the differential equation of the family of circles passing through the points (a, 0) and (-a, 0). (View Answer Video)
Question 2 : Find the differential equation of the family of lines passing through the origin. (View Answer Video)
Question 3 : Find the general solution of differential equation (View Answer Video)
Question 4 : Write the degree of the differential equation (View Answer Video)
Question 5 : Write the differential equation representing the family of curves y = mx, where m is an arbitrary constant. (View Answer Video)
Question 1 : Evaluate : (View Answer Video)
Question 2 : Find the integral of the function . (View Answer Video)
Question 3 : (View Answer Video)
Question 4 : Find : (View Answer Video)
Question 5 : Evaluate : (View Answer Video)