Determine the value of x in this problem involving multiple exponents.
3^2 x 3^-1 x 3^0 x 3^4 = 3^x
Determine the value of x in this problem involving multiple exponents. 3^2 x 3^-1 x 3^0...
Solve the following initial value problem 1 2 3 4 01 63 0 012 x +e' 0001 o x(0)0
Solve the following initial value problem 1 2 3 4 01 63 0 012 x +e' 0001 o x(0)0
1 ]x 3. Solve the initial value problem. 0 0 1 (1) x = 0 10 X, X(0) 1_0_0 5 =3 0 -4 (2) x = -1 -1 -1 X, X(0)= 0 1 1= 13 = la ;1- =ܬ [ 3 2 0 lu-la = lg=-1 1 1
[-12 Points] DETAILS Solve the given initial-value problem. 1 -4 -6 X' 2 -3 X, X(0) = 1 1 -2 1 -( W NU -3 X(t) = Submit Answer [-12 Points] DETAILS Solve the given initial-value problem. x = $ =)x, x(0) = -(-3) X(t) =
3,,-2 4. Multiply: (3u3v4) (-3uv2 2 5. Simplify (positive exponents) -9 x y Simplify (positive exponents)--14.9 I i TAM
need to answer problem 4 but this requires info from 2 and
3
2. Determine all pairs (α. β) for which the problem x solution x. x (0) α. x(1) β has a (Continuation) Repeat the preceding problem for x"--x. x (0) β α, x(7) (Continuation) Give an example of a two-point boundary-value problem (p. 572) of type (3), for which there is more than one solution. Hint: Consider the preceding problem.
2. Determine all pairs (α. β) for which...
3. (4 pts) Use properties of exponents to rewrite log in terms of multiple logarithms.
2 4. Solve the initial value problem: X' 1 1 4 0 2 0 1 1 1 X X(0) = 6 0
Questo 3. 0 Problem 5-49 Present Value and Multiple Cash Flows [LO 1 Value today What is the present value of $2.025 per year atascount rate of 7 percent, the first payment is received years from now and the last payments received 23 years from now? Do not round Intermediate calculations and round your answer to 2 decimal places, ... 32.16.) References Worksheet Pr 5 -49 Present Value and Multiple Cash FlowLO1 3 4 * 5 6 7 8 9...
2. Solve the initial value problem. -2 2 (1) X"(t) = X, X(0) = 2 -2 0 0 X'(0) = 8 0 0 -1 2 -:] X, X(0) = 0 0 X'(0) 3 0 (2) X"(t) = 1 (3) X"(t) = 1 -6 6 3 -3 ] X X(0) = X(0) = [ 8 ] X'O) = 1 - [8]
3) Solve the initial value problem: x' = 1 - 2step(t-1) + step(t - 2);x(0) = 0