12/15/2023 0 Comments Empirical rule percentages![]() ![]() Then, I popped open the latest nightly copilot. The nitty gritty is: I downloaded Recaf for decompiling/recompiling. Well, I find life without Copilot very tedious, and I definitely can't live without undo/redo, so I figured out how to edit the offending. So, 99.7% of the data will fall between the mean μ plus or minus 3 times the standard deviation σ.: Cannot invoke (class=CopilotCommandListener, method=undoTransparentActionStarted, topic=CommandListener)Īt .(MessageBusImpl.kt:657)Īt .(MessageBusImpl.kt:482)Īt .$intellij_platform_core(CompositeMessageBus.kt:294)Īt .(MessageBusImpl.kt:442)Īt jdk.proxy1/jdk.proxy1.$Proxy95.undoTransparentActionStarted(Unknown Source)Īt .(CoreCommandProcessor.java:365)Īt .ex.LineStatusTrackerBase$Companion.updateDocument(LineStatusTrackerBase.kt:291)Īt .ex.LineStatusTrackerBase.updateDocument(LineStatusTrackerBase.kt:133)Īt .ex.LineStatusTrackerBase.updateDocument(LineStatusTrackerBase.kt:127)Īt .ex.tBaseRevisionContent(LineStatusTrackerBase.kt:79)Īt .ex.tBaseRevisionContent(LineStatusTracker.kt:111)Īt .ex.tBaseRevision(PartialLocalLineStatusTracker.kt:215)Īt .(LineStatusTrackerManager.kt:1422)Īt .impl.LineStatusTrackerManager$MyBaseRevisionLoader.handleSuccess(LineStatusTrackerManager.kt:606)Īt .impl.LineStatusTrackerManager$MyBaseRevisionLoader.handleResult(LineStatusTrackerManager.kt:551)Īt .impl.LineStatusTrackerManager$MyBaseRevisionLoader.handleResult(LineStatusTrackerManager.kt:493)Īt .impl.SingleThreadLoader$handleSingleRequest$1.invoke(LineStatusTrackerManager.kt:1291)Īt .impl.SingleThreadLoader$handleSingleRequest$1.invoke(LineStatusTrackerManager.kt:1285)Īt .ActionsKt.invokeLater$lambda$5(actions.kt:58)Īt .TransactionGuardImpl$1.run(TransactionGuardImpl.java:194)Īt .(ApplicationImpl.java:831)Īt .impl.ApplicationImpl$3.run(ApplicationImpl.java:456)Īt .(FlushQueue.java:79)Īt .(FlushQueue.java:122)Īt .(FlushQueue.java:41)Īt sktop/.dispatch(InvocationEvent.java:318)Īt sktop/(EventQueue.java:788)Īt sktop/$3.run(EventQueue.java:739)Īt sktop/$3.run(EventQueue.java:731)Īt java.base/(AccessController.java:399)Īt java.base/$JavaSecurityAccessImpl.doIntersectionPrivilege(ProtectionDomain.java:86)Īt sktop/(EventQueue.java:758)Īt .defaultDispatchEvent(IdeEventQueue.kt:666)Īt ._dispatchEvent$lambda$7(IdeEventQueue.kt:570)Īt .(ApplicationImpl.java:1442)Īt ._dispatchEvent(IdeEventQueue.kt:570)Īt .access$_dispatchEvent(IdeEventQueue.kt:68)Īt $dispatchEvent$processEventRunnable$1$1$1.compute(IdeEventQueue.kt:349)Īt $dispatchEvent$processEventRunnable$1$1$1.compute(IdeEventQueue.kt:348)Īt .(CoreProgressManager.java:787)Īt $dispatchEvent$processEventRunnable$1$1.invoke(IdeEventQueue.kt:348)Īt $dispatchEvent$processEventRunnable$1$1.invoke(IdeEventQueue.kt:343)Īt .performActivity$lambda$1(IdeEventQueue.kt:994)Īt .TransactionGuardImpl.performActivity(TransactionGuardImpl.java:105)Īt .performActivity(IdeEventQueue.kt:994)Īt .dispatchEvent$lambda$4(IdeEventQueue.kt:343)Īt .dispatchEvent(IdeEventQueue.kt:385)Īt sktop/(EventDispatchThread.java:207)Īt sktop/(EventDispatchThread.java:128)Īt sktop/(EventDispatchThread.java:117)Īt sktop/(EventDispatchThread.java:113)Īt sktop/(EventDispatchThread.java:105)Īt sktop/(EventDispatchThread.java:92)Ĭaused by: kotlin.UninitializedPropertyAccessException: lateinit property mainSplitters has not been initializedĪt .(FileEditorManagerImpl.kt:133)Īt .(FileEditorManagerImpl.kt:525)Īt .(FileEditorManagerImpl.kt:1384)Īt .(FileEditorManagerImpl.kt:1370)Īt .CopilotCommandListener.getSelectedEditor(CopilotCommandListener.java:147)Īt .CopilotCommandListener.undoTransparentActionStarted(CopilotCommandListener.java:102)Īt .(MessageBusImpl.kt:677)Īt .(MessageBusImpl.kt:644)īeta Was this translation helpful? Give feedback. The third part of the rule states that 99.7% of the data falls between these two values: So, 95% of the data will fall between the mean μ plus or minus 2 times the standard deviation σ. The second part of the rule states that 95% of the data falls between these two values: Thus, 68% of the data will fall between the mean μ plus or minus the standard deviation σ. The first part of the rule states that 68% of the data falls between these two values: The empirical rule can be represented in three parts using the following formulas: The standard deviation is a measure of the variability within the data and is represented using the greek letter sigma σ. ![]() If you’re just getting started with statistics, the mean is the average value of the data set and is often represented using the greek letter mu μ.
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