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wpimath/trampolines/wpi__math__SwerveDriveOdometry.hpp,sha256=FiSx3ZxIycUMRsKguSsKmU0O9LVrzlzC9P0lpikf2hA,2419
wpimath/trampolines/wpi__math__SwerveDriveOdometry3d.hpp,sha256=YbC-KbKdpuYaVrKw959nCI7BJSdPz3t3p0F0LSHAzPM,2051
wpimath/trampolines/wpi__math__SwerveDrivePoseEstimator.hpp,sha256=Ewi7_31-Q07OkgRHQKHktm0oU9LLsAZt_YmIr2VkeDY,5250
wpimath/trampolines/wpi__math__SwerveDrivePoseEstimator3d.hpp,sha256=UVmnPDntTkRx39HStaVaWAAYCn9Qk1JCZ2caxMob0-Y,5224
wpimath/trampolines/wpi__math__SwerveModuleAcceleration.hpp,sha256=isGaqnAZTlfBa3bPfxD8lJSkHFe88nmb7Si90iq98s4,278
wpimath/trampolines/wpi__math__SwerveModulePosition.hpp,sha256=E1My04LU_oEL0pSwQ8mk1dAqhNDs0tWVDwx46v0b7JY,270
wpimath/trampolines/wpi__math__SwerveModuleVelocity.hpp,sha256=dgVGi_o4_8M1e2VXRL3w5k0h5QH72y_cycqWY9x6u1I,270
wpimath/trampolines/wpi__math__TimeInterpolatableBuffer.hpp,sha256=ppe93y7xMF5l-tbSEPkgWJRexrYQHlAksd53I1hp0rk,3939
wpimath/trampolines/wpi__math__Trajectory.hpp,sha256=blazNjqxLAKGWHtcAdduo23HYG7hx8h1lp-ThN3K8Uc,257
wpimath/trampolines/wpi__math__TrajectoryConfig.hpp,sha256=how3kIrmZ_Nqk7_CBInbAnhdiIs6BRNmuNbtTh4lJhI,275
wpimath/trampolines/wpi__math__TrajectoryConstraint.hpp,sha256=LfFY5SbEgJeyHMDozwTbIdzexfnOvRFbY6S6768CHc0,1842
wpimath/trampolines/wpi__math__TrajectoryConstraint__MinMax.hpp,sha256=x1PeqpTPJWmXNZsYphD3rLqcTV7PmAzvvISku1RuAz8,242
wpimath/trampolines/wpi__math__TrajectoryGenerator.hpp,sha256=NfvghEUSvfcxDsrOHw5u_abeZrmxa3WC8NfNVWUJFtw,347
wpimath/trampolines/wpi__math__TrajectoryParameterizer.hpp,sha256=rFsNkHToNt80_pSen4eZrqTX5ZgcuScO6E5wfnZ9WOk,229
wpimath/trampolines/wpi__math__Trajectory__State.hpp,sha256=y6r17R9aUW56eG7kLK8TUeck_EyK_mPGwj5I3sEczYc,264
wpimath/trampolines/wpi__math__Transform2d.hpp,sha256=XmfQCQxKXW_MYMF-00yJOtuZoOBy4kHJQHezfeMvMZ0,320
wpimath/trampolines/wpi__math__Transform3d.hpp,sha256=B3kaK11h4W8GT6k31OtpE4xty5szmaiM6ClsmYmLCyM,280
wpimath/trampolines/wpi__math__Translation2d.hpp,sha256=Y2cv6a8uZnvPCcdrgEOWwWBZEe6eVW0L5CEQYly-g20,312
wpimath/trampolines/wpi__math__Translation3d.hpp,sha256=4O-fCVstD-XGrBNcczr9hMJrNMMTTBuGm3gg-VqpGNA,312
wpimath/trampolines/wpi__math__TrapezoidProfile.hpp,sha256=_kcxg5sjRsCXnQ7wUkST1OVn1fQhZ8hglkBuH2bPQRI,7439
wpimath/trampolines/wpi__math__TrapezoidProfile__Constraints.hpp,sha256=cK4-lo73clM9X0RG6h9VAjJJLKycKhx60m8PpbOBAHI,238
wpimath/trampolines/wpi__math__TrapezoidProfile__State.hpp,sha256=adwpWoLsT7QUUikt_t6M9caG-4AU624B9rpIij7BhvY,232
wpimath/trampolines/wpi__math__TravelingSalesman.hpp,sha256=VoN0qGsqT43X2iYS8kfYcRRLP2F8Zgfg7t_1hbWbJXU,211
wpimath/trampolines/wpi__math__Twist2d.hpp,sha256=-JYMABptPSyODO0KGctthT94MU-uhtqvbb2u3_BiuKc,242
wpimath/trampolines/wpi__math__Twist3d.hpp,sha256=uoJRKtFE-qADW41cWcKqXC4OgNIaRp4hrNda60ltTKw,242
robotpy_wpimath-2027.0.0a4.dist-info/METADATA,sha256=_bYzXLnlyLH73UD0F-UsB1D1QHd7Uhex8i247adIrCg,369
robotpy_wpimath-2027.0.0a4.dist-info/WHEEL,sha256=uMKjoP55u6YzaHTAa8ORIIpr47djD_WUfrWx5gAfThw,106
robotpy_wpimath-2027.0.0a4.dist-info/entry_points.txt,sha256=I9nzOPB7l0bBu5z51FFTDtCZ6kTbgZRFGqCmIu-Ps9Y,57
robotpy_wpimath-2027.0.0a4.dist-info/RECORD,,
