A Plug-in Test Case Generation Method based on Contact Layer Proximity and Node Probability Coverage
Qian Zhongsheng,Hong Dafei,Wang Xiaojin
Table 1 The unreachable paths in triangle-classifying program
Path list
R1=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, d13 , $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$,ed>
R2=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$, ed>
R3=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$, ed>
R4=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$, ed>
R5=<st, $d_{1}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$, ed>
R6=<st, $d_{1}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$, ed>
R7=<st, $d_{1}$, $d_{5}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$, ed>
R8=<st, $d_{1}$, $d_{5}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, $d_{19}$, ed>
R9=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{14}$, ed>
R10=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{18}$, $d_{19}$, ed>
R11=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, ed>
R12=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{18}$, ed>
R13=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, ed>
R14=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, ed>
R15=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, ed>
R16=<st, $d_{1}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, ed>
R17=<st, $d_{1}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{18}$, $d_{19}$, ed>
R18=<st, $d_{1}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{18}$, ed}>
R19=<st, $d_{1}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, ed>
R20=<st, $d_{1}$, $d_{5}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{17}$, $d_{18}$, ed>
R21=<st, $d_{1}$, $d_{2}$, $d_{3}$, $d_{4}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{18}$, $d_{19}$, ed>
R22=<st, $d_{1}$, $d_{5}$, $d_{6}$, $d_{7}$, $d_{8}$, $d_{9}$, $d_{10}$, $d_{11}$, $d_{12}$, $d_{13}$, $d_{15}$, $d_{16}$, $d_{18}$, $d_{19}$, ed>