1. How many number of branches the root loci of the equation s(s + 2)(s + 3) + K(s + 2) = 0 have?





Write Comment

Type in
(Press Ctrl+g to toggle between English and the chosen language)

Comments

Tags
Show Similar Question And Answers
QA->Which Indian bank has largest number of branches?....
QA->The number of null branches for a binary tree with n nodes is:....
QA->WHICH INDIAN BANK HAS THE HIGHEST NUMBER OF BRANCHES IN THE WORLD....
QA->If the solution set of the equation ax2+bx+c=0 is {α, β} then α-β is:....
QA->The characteristic equation of gas is :....
MCQ->Consider the following statements about root locus The intersection of root locus branches with the imaginary axis can be determined by the use of Routh criterionSegments of real axis having an odd number of real axis open loop poles plus zeros to their right are not parts of root locusThe number of root locus branches terminating on infinity is always zero Which of the above statements are correct?....
MCQ->The root locus plot of the roots of the characteristics equation of a closed loop system having the open loop transfer function will have a definite num-ber of loci for variation of K from 0 to ∞. The number of loci is....
MCQ->Consider the following statements about root locus The root locus is symmetrical about real axis.If a root locus branch moves along the real axis from an open loop pole to zero or to infinity, this root locus branch is called real root branch.The breakaway points of the root locus are the solutions of Which statements out of above are correct?....
MCQ->Statements: All branches are flowers. All flowers are leaves. Conclusions: All branches are leaves. All leaves are branches. All flowers are branches. Some leaves are branches.

....
MCQ->Choose the conclusion which logically follow from the given statement irrespective of commonly known facts. Statement : All branches are flowers. All flowers are leavesConclusion : I. All branches are leaves II. All leaves are branches III. All flowers are branches IV. Some leaves are branches....
Terms And Service:We do not guarantee the accuracy of available data ..We Provide Information On Public Data.. Please consult an expert before using this data for commercial or personal use
DMCA.com Protection Status Powered By:Omega Web Solutions
© 2002-2017 Omega Education PVT LTD...Privacy | Terms And Conditions