Evaluate the following integral using the techniques specified below (1-e*)dx a) b) analytically using the symbolic algebra capability in matlab single application of the trapezoid rule. to do this create a function called trapf that takes as input the following parameters function handle to an anonvmous function lower limit of integration . upper limit of integration number of segments c) composite trapezoid rule with n-2. use your function from part b d) composite trapezoid rule with n-4. use your function from part b e) single application of simpson's 1/3 rule. to do this create a function called simp13 that tak es as input the following parameters function handle to an anonymous function lower limit of integration upper limit of integration number of segments

5050 i think

step-by-step explanation:

simplifying

5(x + -6) = 2(x + 3)

reorder the terms:

5(-6 + x) = 2(x + 3)

(-6 * 5 + x * 5) = 2(x + 3)

(-30 + 5x) = 2(x + 3)

reorder the terms:

-30 + 5x = 2(3 + x)

-30 + 5x = (3 * 2 + x * 2)

-30 + 5x = (6 + 2x)

solving

-30 + 5x = 6 + 2x

solving for variable 'x'.

move all terms containing x to the left, all other terms to the right.

add '-2x' to each side of the equation.

-30 + 5x + -2x = 6 + 2x + -2x

combine like terms: 5x + -2x = 3x

-30 + 3x = 6 + 2x + -2x

combine like terms: 2x + -2x = 0

-30 + 3x = 6 + 0

-30 + 3x = 6

add '30' to each side of the equation.

-30 + 30 + 3x = 6 + 30

combine like terms: -30 + 30 = 0

0 + 3x = 6 + 30

3x = 6 + 30

combine like terms: 6 + 30 = 36

3x = 36

divide each side by '3'.

x = 12

simplifying

x = 12

this should .

answer: b

step-by-step explanation: im sorry bro bro but thats not a eqation the human mind can answer and plus im a devil