Question

(1 point) Let y" + ly' – 12y=0. a. Try a solution of the form y=e", for some unknown constant r, by substituting it into the differential equation. = 0. help (formulas) b. Simplify and factor your equation in the previous part as much as possible. Be sure to divide out any factors guaranteed to be nonzero. = 0. help (formulas) c. Find all values of r such that y=e" satisfies the differential equation. If there is more than one correct answer, enter your answers as a comma separated list. r = help (numbers)

Answer 1

if it is helpful, please give thumbs-up. You may ask, if you have any doubt.

3 Given that y"+y'-12y=0 Tet y = er be a solution given differential equation. of into y rera Y" = r² erx substituting the value of y y',y" the given differential equation, we have [²ext rere 12 er sol implies (6) Now, above equation within box (x²+8-12) ex = 0 dividing both sides by ex (cer so se exto). we get 8² +8-12 = 0 2 +48-38 - 12 = 0 rer+4)-3(r + 4) = 0 (x+4) (7-3)=0 from above equation within box, we obtain the value of r such that y=elt satisies the differential equation. 18+4) (8-3)=0 = (x+4=0) or (x-3)=0 = 3/8=-43