Find the complete integral of q = 2px
Answers
Answer:
Hence the complete integral is z = ax+by-a-2b+3. 15. Find the complete integral of q = 2px. Soln: Given q = 2px This equation is of the form f(x,p,q)=0 Let q = a then p = x a 2 We know that dz = x a 2 dx + ady Integrating on both sides ∫dz = ∫ x a 2 dx+∫a dy z = 2 a logx+ay+b.
Answer:
Finding the area away from the x axis from the curve while determining the integral of a function with respect to x.
Step-by-step explanation:
What does taking integral mean?
If q = 2px, then
f(x,p,q)=0 is the form of this equation.
Suppose q = a, then p = x a. 2
We understand that dz = x a 2 dx + ady.
reconciling on all sides dz = x a 2 dx + a dy
z = 2 a logx + ay + b.
In math, an integral is either a number equal to the region under the graph of a function over a certain interval or a new function, the derivative of which equals the original function (indefinite integral).
Finding the area away from the x axis from the curve when calculating the integral of a function with respect to x Because integrating is the opposite of differentiating, it is commonly referred to as the anti-derivative.
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