Ideal is roughly 1900-1970, after that they get more difficult again.epenguin said:Perhaps you would find a more recent textbook easier to work from.
If I have understood right your missing thing is the standard formula for derivative of a quotient, one of the half-dozen practically learned off by heart by most calculus students, see any calculus textbook:
y/x = q
dq = d(y/x) = (x dy - y dx)/x2
His formula Is just given by multiplying dq = (x dy - y dx)/x2 by q2
Conte Riccati and Jakob Hermann were two prominent mathematicians who lived during the 18th century. Conte Riccati was an Italian nobleman and mathematician, known for his contributions to calculus and differential equations. Jakob Hermann was a German mathematician and physicist, who made significant contributions to the field of mechanics and geometry.
Conte Riccati and Jakob Hermann were colleagues and corresponded with each other on various mathematical topics. They also collaborated on a number of projects, including a paper on the theory of curves.
Conte Riccati is known for his work on the Riccati equation, which is a type of differential equation used to model physical phenomena. He also made significant contributions to the development of calculus and the study of curves. Jakob Hermann is known for his work on mechanics and geometry, including his formulation of the principle of least action and his contributions to the study of conic sections.
The work of Conte Riccati and Jakob Hermann laid the foundation for many important mathematical concepts and theories that are still used today. Their contributions to calculus, differential equations, and geometry continue to be studied and applied in various fields of mathematics and science.
The collaboration between Conte Riccati and Jakob Hermann demonstrates the importance of collaboration and communication in the advancement of knowledge. Their combined efforts and exchange of ideas led to significant developments in mathematics, and their work continues to be studied and built upon by future generations of mathematicians.
