Answer:
Yes, x(t)+C is also a solution of given equation.
Step-by-step explanation:
We are given that x(t) is a solution of the equation x'=f(x)
We have to show that x(t+c) is also a solution of given equation and check x(t)+c is a solution of equation.
Suppose x'=1
Integrating on both sides
Then , we get
Where C is integration constant.
Now, t replace by t+c
Then, we get
because c+C=K
Different w.r.t then we get
Therefore, x(t+c) is also solution because it satisfied the given equation.
Now, x(t)+C=t+(c+C)=t+L where L=c+C=Constant
Differentiate w.r.t time
Then, we get
Yes, x(t)+C is also solution of given equation because it satisfied given equation
Letter C)63=9x7, multiplication
Answer:
16g + 12
Step-by-step explanation:
6(3g + 2) - 2g
18g + 12 - 2g
16g + 12
3/7 is the correct answer.
explanation:
Dividing is equivalent to multiplying with the reciprocal.
9/7 x 1/3
Reduce the numbers with greatest common factor: 3
3/7 x 1 = 3/7
Answer:
-5 1/x4
Step-by-step explanation: