MATHEMATICS PART-2 · CBSE Class 12th English Medium
6 chapters · 77 topics
Chapter 7: INTEGRALS
- it is there. — JAMES B. BRISTOL v
- INTEGRALS
- A Note In practice, we normally do not mention the interval over which the various
- dx ∫
- A Note From now onwards, we shall write only one constant of integration in the
- A Note From now onwards, we shall write only one constant of integration in the · Part
- A Note From now onwards, we shall write only one constant of integration in the · Part
- (iv) ∫ cosec
- (ii) ∫
- A ( x ) = ∫
- an anti derivative of f . Then ∫
- A Note In order to quicken this method, we can proceed as follows: After
- A Note In order to quicken this method, we can proceed as follows: After · Part
- A Note In order to quicken this method, we can proceed as follows: After · Part
- ® Some properties of indefinite integrals are as follows:
- ® Integration by partial fractions
- ® Integration by substitution
- ® Integration by parts
- ® Some special types of integrals
- ® We have defined
- ® First fundamental theorem of integral calculus
Chapter 8: APPLICATION OF INTEGRALS
Chapter 9: DIFFERENTIAL EQUATIONS
- seeks for the most part in vain. – D. HILBERT v
- DIFFERENTIAL EQUATIONS
- A Note
- A Note Order and degree (if defined) of a differential equation are always
- A Note Order and degree (if defined) of a differential equation are always · Part
- A Note Order and degree (if defined) of a differential equation are always · Part
- A Note Order and degree (if defined) of a differential equation are always · Part
- A Note Order and degree (if defined) of a differential equation are always · Part
- A Note If the homogeneous differential equation is in the form
- ® Degree (when defined) of a differential equation is the highest power (positive
- ® A differential equation of the form
Chapter 10: VECTOR ALGEBRA
- builds a new story to the old structure. – HERMAN HANKEL v
- Chapter
- Chapter · Part
- Chapter · Part
- Chapter · Part
- A Note From Fig . , using the triangle law, one may note that
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note From Fig . , using the triangle law, one may note that · Part
- A Note In Example , one may note that although
- A Note In Example , one may note that although · Part
- A Note In Example , one may note that although · Part
- A Note There are two perpendicular directions to any plane. Thus, another unit
- A Note There are two perpendicular directions to any plane. Thus, another unit · Part
- A Note There are two perpendicular directions to any plane. Thus, another unit · Part
- A Note There are two perpendicular directions to any plane. Thus, another unit · Part
- ® The scalar components of a vector are its direction ratios, and represent its
- ® If we have two vectors
Chapter 11: THREE DIMENSIONAL GEOMETRY
- reasoning but imagination. – A.DEMORGAN v
- Chapter
- Chapter · Part
- Chapter · Part
- Chapter · Part
- Chapter · Part
- Chapter · Part
- ® Direction cosines of a line are the cosines of the angles made by the line
- ® Direction ratios of a line are the numbers which are proportional to the
- ® Angle between skew lines is the angle between two intersecting lines