wpimath/__init__.py,sha256=hRxphQMYjYaodelHylm0nvFNP5rFGJtLABF8nfB6X18,11869
wpimath/py.typed,sha256=47DEQpj8HBSa-_TImW-5JCeuQeRkm5NMpJWZG3hSuFU,0
wpimath/units.py,sha256=BVyog4muhk_vQRoBu1Vl9PoM6ED9YRriORlChry-fRQ,11485
wpimath/version.py,sha256=kUbCwXvllT0wYucj1Gh1mo-NJegqAB4n6XmuM9ZiQLQ,99
wpimath/_impl/__init__.py,sha256=hC7_ZSspJy6yYFb22hIoeKMKK0rEADBSbxGbOQJ7p1s,33
wpimath/_impl/src/PyTrajectoryConstraint.h,sha256=jvHtp50CQNAJz6Tyb0bNP4OeZSF25UwVxuUhBNErs2M,1658
wpimath/_impl/src/geometryToString.h,sha256=xJsS5HdJncETnoSZCxaL7F8hsHgfWMpszpsK_zk4Y_M,2998
wpimath/_impl/src/type_casters/_units_base_type_caster.h,sha256=J8d-vT9dZVi8t12b-FqCwp-1ll9-_01Ysoz3i24JawA,1814
wpimath/_impl/src/type_casters/units_acceleration_type_caster.h,sha256=_ZVp1IIw3P_y43PwbU60pbgDn2Sy4W0FdUfRwtYgHd8,1121
wpimath/_impl/src/type_casters/units_angle_type_caster.h,sha256=jFS4FzgZF5pNbvofZ6F6PLIgjJpcVu49VlhIri9Au38,3087
wpimath/_impl/src/type_casters/units_angular_acceleration_type_caster.h,sha256=X-kKEsYYoNBcpLrieQMH2vifAhm3A0Rtd3pqFkVBMig,1177
wpimath/_impl/src/type_casters/units_angular_velocity_type_caster.h,sha256=k1uuF4WRAEJ7ey1QvtzaBxBrRJLp8PVf-wHwuuAeyR4,1713
wpimath/_impl/src/type_casters/units_area_type_caster.h,sha256=gLm9hkE-tAtzD6mCrewg6COsifTSL7KjPG-C8bzXyaA,2070
wpimath/_impl/src/type_casters/units_capacitance_type_caster.h,sha256=ZUlqesqh26zSjr4GPONO2p2yn5rOObHw-0PDLdCPycA,1503
wpimath/_impl/src/type_casters/units_charge_type_caster.h,sha256=xpvm-CoTpJYqp4hKutgDMmOKg3s33H32gO4o20Dghj0,2975
wpimath/_impl/src/type_casters/units_compound_type_caster.h,sha256=nqb1lkLU-GFH9w3h8XVu9095wu02Bq1dQposST3FUR0,3846
wpimath/_impl/src/type_casters/units_concentration_type_caster.h,sha256=ZzytiDKfJ0ZLYtDW3C05of01V_9I_okeF-68N8LDNlY,1285
wpimath/_impl/src/type_casters/units_conductance_type_caster.h,sha256=VZz1qTVXrJlbe_Z8L2uzNaMqJgfrBI_dPM88TJMqMkE,1528
wpimath/_impl/src/type_casters/units_current_type_caster.h,sha256=d3GhCc5TihLd3sTetMflmgJ_7mH38kjoXjwBbOrmlqk,1519
wpimath/_impl/src/type_casters/units_data_transfer_rate_type_caster.h,sha256=2K8qdh2WsTlDo0Gaey6gii-ScaNX9mKV7NMPyOoqPhc,793
wpimath/_impl/src/type_casters/units_data_type_caster.h,sha256=MCeZQpMOJROvI5IKJ6MZzcbutn6UlanJlX1CEE3Vh4E,689
wpimath/_impl/src/type_casters/units_density_type_caster.h,sha256=qE5O8Fgc7g6FBB3jnZx3yrcFDU_BlSuOX482TGEQpPo,3250
wpimath/_impl/src/type_casters/units_energy_type_caster.h,sha256=UxIwgdUQbdhh2phu6XXBuYC58OzWICxI8YAQXU8_fF0,4874
wpimath/_impl/src/type_casters/units_force_type_caster.h,sha256=yswl9uW3lzMKOAz99DjgS0r_cycHqtGmTFk2U3EOpmw,2529
wpimath/_impl/src/type_casters/units_frequency_type_caster.h,sha256=Dita1c-bDI-aUPtqa-7tv4nixbcHIi1gGms_Kp6uEY0,1486
wpimath/_impl/src/type_casters/units_illuminance_type_caster.h,sha256=9xJvVc7g83UtnLDVGMuhysxATeNwfoReFjzLuIvHZck,2306
wpimath/_impl/src/type_casters/units_impedance_type_caster.h,sha256=6QLmVQCRrwKVLjctUMGFGMCfnptX02SdWK6rFbEh8zY,1461
wpimath/_impl/src/type_casters/units_inductance_type_caster.h,sha256=t_yzL5AskJXa6rbfNagAvVxm7DJY3JNxAhZ2nnaxrsQ,1517
wpimath/_impl/src/type_casters/units_length_type_caster.h,sha256=X8K_GjNQCpe4M8odtKHeWUhx1aJ0EiX29JNc0oxAQFQ,6120
wpimath/_impl/src/type_casters/units_luminous_flux_type_caster.h,sha256=OYsDV4IvSlyh0ESgwEe02jPWSlXtRx0oLVItWfF76FI,1505
wpimath/_impl/src/type_casters/units_luminous_intensity_type_caster.h,sha256=3i2CAJBfsZ_Ezny_lkwa9F6_7i_IUZw5sh2rK9I1TGo,1550
wpimath/_impl/src/type_casters/units_magnetic_field_strength_type_caster.h,sha256=f5LNTs9X6dFDhD6HqXHYoTq9DelOS0wj_iZyN_YCTTs,1761
wpimath/_impl/src/type_casters/units_magnetic_flux_type_caster.h,sha256=iPNr9oNyM4F_0bVEme1Kzc1IdC178iG3MhgIml2HFt8,1762
wpimath/_impl/src/type_casters/units_mass_type_caster.h,sha256=ajIZJ6BTo_8vfTEOy9jVWBoHqPn6oNDr4E6xNqHcphc,3509
wpimath/_impl/src/type_casters/units_misc_type_caster.h,sha256=fzVFuQzyGQOBOkK274ngzEaZuNSE5Tgmh5lbM1oSdJc,711
wpimath/_impl/src/type_casters/units_moment_of_inertia_type_caster.h,sha256=MXeXjzuxySb1LZfcu2SkADEKhUcmPvjtHvcy7ZTHzkY,505
wpimath/_impl/src/type_casters/units_power_type_caster.h,sha256=ehEdchrZCTt48uc1AwHpkfC2MlW8QPAFzKmVPN93mPM,1743
wpimath/_impl/src/type_casters/units_pressure_type_caster.h,sha256=wJToIGo_8O4XUmuwdiQRsv0B8KDtJZA2ML0X6tnwuE4,2834
wpimath/_impl/src/type_casters/units_radiation_type_caster.h,sha256=m0-H1pWdi10nHwOH2OuAO5_gNoY1ozvhpC1PUTS910k,4994
wpimath/_impl/src/type_casters/units_solid_angle_type_caster.h,sha256=9jhl-CIhwx_uQDlVPfBugZYXL4HOMNujQ1ecHzw5zi0,2113
wpimath/_impl/src/type_casters/units_substance_type_caster.h,sha256=5Oo2ectkglK74niPzqQjmcsDoW5gpWoTBVaSmdGvMaU,429
wpimath/_impl/src/type_casters/units_temperature_type_caster.h,sha256=nzuNfh6P7lnE-wgZja_RXQ_XuJqTl8aHG7ZmdodQ-A4,1464
wpimath/_impl/src/type_casters/units_time_type_caster.h,sha256=qqBJJPcZ8sPiLzKjinli05rFr_fb20l5r59aRfCf948,3303
wpimath/_impl/src/type_casters/units_torque_type_caster.h,sha256=VmUzxsxaCrgkPR37Nw8af4TUnAfQxKwepdtMjxCcNZw,1576
wpimath/_impl/src/type_casters/units_velocity_type_caster.h,sha256=eTZMRxxAFwhvoLCFjbh4LMp_LvST24XiB_4HDUCCd6Q,1592
wpimath/_impl/src/type_casters/units_voltage_type_caster.h,sha256=osKkbPQG31gbDSCbBaclbr4EoJ8jkjr-3wzBVy3JYw0,1993
wpimath/_impl/src/type_casters/units_volume_type_caster.h,sha256=gfmdr-xa3Fw_4B-NOcDpZ-w3JzOmHSj2QTR5tVMciog,8720
wpimath/_impl/src/type_casters/wpi_eigen.h,sha256=QDgtziJBeLbBhpYUvmsqTE0dURt2Yu_2hc2UX5nTbSw,112
wpimath/src/wpimath.cpp,sha256=KU8uGKPQtxfAIosUI_COMqPaver7UCDl-zUYblHp1uc,100
wpimath/_init__wpimath.py,sha256=_g7xEuQ_p-_F3TFmmLAH_i176a4vzPNi8eXNkM0Ut58,150
wpimath/_wpimath.cp312-win_amd64.lib,sha256=RrzDE_zVvw2VnECHXoBX3DcCqlGoaxi1CpN8J_1xeg8,2032
wpimath/_wpimath.cp312-win_amd64.pyd,sha256=4akNPk8zVZlBk4XLU5_R1Pt1BNB3Dqpfeh9cQNhKnXo,4838912
wpimath/_wpimath.pyi,sha256=K4TR8DmGnaMzt9MyTf6nH7xbGacJfE4ZJ2wn1sgpivM,872065
wpimath/wpimath-casters.pc,sha256=E92W_u-v1LBcRLoOujxVsiY5C1OuEJ4CJp7wLm7LXlg,277
wpimath/wpimath-casters.pybind11.json,sha256=y6XZPDRZp_hpr66icXurrMdinoCxBA3ZDMIfvfbHa2U,29823
wpimath/wpimath.pc,sha256=nDFXZ33M-dH7K1Ycm_2PKWqTEtu1y7HKBh0jFx12QmY,302
wpimath/trampolines/wpi__math__ArmFeedforward.hpp,sha256=hvzb_KZ_FqTVJGPasTn5ymzUH8jUHtgkZjEIPEBKA2Y,270
wpimath/trampolines/wpi__math__BangBangController.hpp,sha256=5mnbHYqu6hMpKun92cUmJH14xoqR4zzjHBdBzbQYLew,1550
wpimath/trampolines/wpi__math__CentripetalAccelerationConstraint.hpp,sha256=dO1v8wkxeS7hPJDIVoRSXU2EO7x-P1GEzduBzmDsuks,2869
wpimath/trampolines/wpi__math__ChassisAccelerations.hpp,sha256=9gun_fW-nBRBq77sfM3j3UDBbk2uh1gHLgNn6vgzxaw,282
wpimath/trampolines/wpi__math__ChassisVelocities.hpp,sha256=1_4Q5oJTjjq5_BbWctnNLkYmkuDmNpnRITxRpz0MwVw,276
wpimath/trampolines/wpi__math__ControlAffinePlantInversionFeedforward.hpp,sha256=P-TVMN63WBaQqBh6E076dI8qDZ45MIHlbII-WxChzUI,8136
wpimath/trampolines/wpi__math__CoordinateAxis.hpp,sha256=8BGrcPdSP_Md1-BJkJwSol9KpdaCSOZi6zfGDMhu2no,218
wpimath/trampolines/wpi__math__CoordinateSystem.hpp,sha256=SULBy0mYgy8Ad7VY25quUEZ28Wm3tOorqTSYa1DT8vY,222
wpimath/trampolines/wpi__math__CubicHermiteSpline.hpp,sha256=71rHYnMhgQNn3yd9roWsNCCGzJFraprkCI-nXCIfeg8,224
wpimath/trampolines/wpi__math__DCMotor.hpp,sha256=sqDeJvMU-oTuxbYOpx1bqlJiaFs6EhV56A_yU1u2QGk,252
wpimath/trampolines/wpi__math__Debouncer.hpp,sha256=Kw2XDHvRiqX_NkQfJ_4piTn4miCvSA1F0x56B46_eBM,206
wpimath/trampolines/wpi__math__DifferentialDriveAccelerationLimiter.hpp,sha256=kdLuH07E3OXYMN5-S5s2gHN-028Mu9YuOOLnUjhrBQc,264
wpimath/trampolines/wpi__math__DifferentialDriveFeedforward.hpp,sha256=99lpc_Hq0VE_J5thZybC8R2i867bVDnEodrb2IcaFHk,248
wpimath/trampolines/wpi__math__DifferentialDriveKinematics.hpp,sha256=CavIpRZcwSxNgq1G6OHFFmH38tqBAUtwhtCbT6vq5fg,6100
wpimath/trampolines/wpi__math__DifferentialDriveKinematicsConstraint.hpp,sha256=c_w-CFHjVrXpKTKmtIRDLrBLvYXz1p49gEtOdcE9R1U,2909
wpimath/trampolines/wpi__math__DifferentialDriveOdometry.hpp,sha256=gR3wQUnJCFx0o-A6nnyCXZARXcrycLAZIOWLhhUPFxY,242
wpimath/trampolines/wpi__math__DifferentialDriveOdometry3d.hpp,sha256=8HmW0958vDsvGWbFAsNRDAD2Ehkyw1PSeBPWFOy-tOM,246
wpimath/trampolines/wpi__math__DifferentialDrivePoseEstimator.hpp,sha256=SY3MpqMRDWWRk9X38kBAcnc8X8E9onfgI8jtyh9Af3M,251
wpimath/trampolines/wpi__math__DifferentialDrivePoseEstimator3d.hpp,sha256=P4UlZfb2blS7k5fkRF2R0aqIENgMlFYnonF6f8FB_B4,255
wpimath/trampolines/wpi__math__DifferentialDriveVoltageConstraint.hpp,sha256=D0uVJVATqumXug3QiyzEibp2B2xCJVRsxHbJGMlYyvY,2879
wpimath/trampolines/wpi__math__DifferentialDriveWheelAccelerations.hpp,sha256=QuCR-Y10OOIiuMQYWtI8AYcB77HMpOxAxjuXdWAyThQ,312
wpimath/trampolines/wpi__math__DifferentialDriveWheelPositions.hpp,sha256=_tFfTA4X0z84vtzivKTwfMWxs56Wl6JOQkRHRL96k3E,254
wpimath/trampolines/wpi__math__DifferentialDriveWheelVelocities.hpp,sha256=Ti6IhDJLldzawuKPuczTUZOlEs2JLFj2Z1u1OVgABiY,306
wpimath/trampolines/wpi__math__DifferentialDriveWheelVoltages.hpp,sha256=Gq5Uxkhhg3yNxPg2VOHBnGLBzmZRuVD8xhMgQ0cy6iE,302
wpimath/trampolines/wpi__math__EdgeCounterFilter.hpp,sha256=Bo692nRQ0ypXTidsb65TDBPAC_6cvEt6YVHxRbcmZUY,222
wpimath/trampolines/wpi__math__ElevatorFeedforward.hpp,sha256=QXBaveZFeWQFtV5w7AgZ0CPhV4Il3jLC1vLTuzKHIoU,280
wpimath/trampolines/wpi__math__Ellipse2d.hpp,sha256=r54NsD5-qrZiqpCRa8YUE5pgoYJRAOjcuTpvCZ_hQLY,289
wpimath/trampolines/wpi__math__EllipticalRegionConstraint.hpp,sha256=qfz2ynnb_cmArJ4mnRsGlSqSDBqm6EEcQ4c9aOnwA1Y,5852
wpimath/trampolines/wpi__math__ExponentialProfile.hpp,sha256=Cx7WKyHb4S5GMDeyDdekbtzmz9HdHW1kSEaxit7hxrs,9855
wpimath/trampolines/wpi__math__ExponentialProfile__Constraints.hpp,sha256=egnKfpZPBbQAk2tOS7s1rNZ657mqp5umdyQK9EZgQb4,258
wpimath/trampolines/wpi__math__ExponentialProfile__ProfileTiming.hpp,sha256=-Ncgg0AObFth7FGo73XC1nYscS1J1VFT3Q-iY5H5YMM,260
wpimath/trampolines/wpi__math__ExponentialProfile__State.hpp,sha256=pkpii_ebqYPCUlP2D6JJkc8Nl5OX5WmMPUh8ADOdfN0,252
wpimath/trampolines/wpi__math__ExtendedKalmanFilter.hpp,sha256=UEp9fQC7LTiPSpA0WIiQaR2P9ROklT1ApfxaFRUE9tk,10633
wpimath/trampolines/wpi__math__ImplicitModelFollower.hpp,sha256=Pjg9XZGHjcJIm_f0beVgSGiPGfyVclExEe1yHxMFWSA,4626
wpimath/trampolines/wpi__math__KalmanFilter.hpp,sha256=VTETOpZKa4Dr0wG4L4jEPRjcFW4uqTB_91Q7iYgKHvw,7958
wpimath/trampolines/wpi__math__Kinematics.hpp,sha256=ysT6IpmRnte1pjg1TJ8GJuvcHM0ReK2UcznXZV9guAA,10822
wpimath/trampolines/wpi__math__LTVDifferentialDriveController.hpp,sha256=g3dNBNVC_aHILC6L1rymL2vcNbG7KIxjfEL1HitJ2-Y,252
wpimath/trampolines/wpi__math__LTVUnicycleController.hpp,sha256=bLg9FPjZ6xtAhFqrqhqgILPHWNSi5T4VQ4VE_ASDHKw,234
wpimath/trampolines/wpi__math__LinearFilter.hpp,sha256=n-Wd5pUSm30ELao4H4MVTLC8TsjkmH9fl07uXZCChx0,8793
wpimath/trampolines/wpi__math__LinearPlantInversionFeedforward.hpp,sha256=gX9UnA4dnDgoprdLc_BueKt-m_AMk1S210DgetVE0_I,6476
wpimath/trampolines/wpi__math__LinearQuadraticRegulator.hpp,sha256=T-rsWrNIumwWfUIaueJfCb4-zoubKtgSyfrfcznhil0,11021
wpimath/trampolines/wpi__math__LinearSystem.hpp,sha256=8hcfWN0BvRTJLCGy64o7MeUBvQvXDffmGEGxPl8L00g,7191
wpimath/trampolines/wpi__math__LinearSystemLoop.hpp,sha256=K8p24YX_5GZOl3lIQ9sGg-GhsWJNPdCZN7AANRAzL1w,11402
wpimath/trampolines/wpi__math__MaxVelocityConstraint.hpp,sha256=BHMXNRwEQOf9U0W2371KVTVnUpl-nu0wLpB9jZ-MSSA,2749
wpimath/trampolines/wpi__math__MecanumDriveKinematics.hpp,sha256=rtkX6ozs8naa_7cae3bHFSep8OzT2tXOMNQrIVIFEKY,5850
wpimath/trampolines/wpi__math__MecanumDriveKinematicsConstraint.hpp,sha256=TOwM7IVfmJgsOtHiyd8N0J24OkuUSP7eEBicdWJDdc4,2859
wpimath/trampolines/wpi__math__MecanumDriveOdometry.hpp,sha256=UGDtIP51V3hD-ivgWMJ7Y7_JzEz5UmDj2gYMuFr7OSU,232
wpimath/trampolines/wpi__math__MecanumDriveOdometry3d.hpp,sha256=MhBTMLrWP4xDgjeyEa90jLZwI5EgTRPsbU4EJYyAbXk,236
wpimath/trampolines/wpi__math__MecanumDrivePoseEstimator.hpp,sha256=g-DciV1gQKh6Zv_EiyanURNW34LCiF8rHEVy9CxpAbU,241
wpimath/trampolines/wpi__math__MecanumDrivePoseEstimator3d.hpp,sha256=m-HjpNDUvCBg4hCybwYHCFHGyttvprGRpRXc5hR2Lik,245
wpimath/trampolines/wpi__math__MecanumDriveWheelAccelerations.hpp,sha256=i28iACQSRkRBNfC_bcBIzFrjAVZGQX0PTgvXaiTRppw,302
wpimath/trampolines/wpi__math__MecanumDriveWheelPositions.hpp,sha256=1WbZ_faZZqzIYOixvfGrp6w7v0_T_D7wXlWP0WI7PBc,244
wpimath/trampolines/wpi__math__MecanumDriveWheelVelocities.hpp,sha256=3JBjoTVTcAv-kCrDD29iW8MbzpUkbrNzSc4swGURcGY,296
wpimath/trampolines/wpi__math__MedianFilter.hpp,sha256=wMyEubTi90hRb2OHCVcFVeDnsSl-YSMAAhkLWocWhS4,2238
wpimath/trampolines/wpi__math__Models.hpp,sha256=KSPCxe3_33W0qdxZ9mfUTSmK9rY2OhfqUSpPmQxct8k,200
wpimath/trampolines/wpi__math__Odometry.hpp,sha256=lCo9BTZyHcXyjQbemnsslXIO_0KxiCo66r9SaTrVaZY,5807
wpimath/trampolines/wpi__math__Odometry3d.hpp,sha256=7n0nfI8DHUpPaz3Y7VnsOzwId8P4h6A4csBYQjhRBLA,5859
wpimath/trampolines/wpi__math__PIDController.hpp,sha256=lu_eLyDB6hDLDUWka0YoCOIlMhc8pYIvsFDB_uRlHyM,1505
wpimath/trampolines/wpi__math__Pose2d.hpp,sha256=UTTpcffwVfcybJbR-yuccRaPrlm5zStFjZRugjBCGxQ,283
wpimath/trampolines/wpi__math__Pose3d.hpp,sha256=Z_99XMgXiI_MM6w5BQFX4G4HflcTBC8G1sS3kGflwiA,283
wpimath/trampolines/wpi__math__PoseEstimator.hpp,sha256=flGTAFLx3LIqe8-Uw-TlmZ0-WSZiQJBU7ylUz2nkroY,12364
wpimath/trampolines/wpi__math__PoseEstimator3d.hpp,sha256=n3D6aIm_PgF3gV4dXp9p5a0nq6ZweKhC_ZPHSEo25H0,12810
wpimath/trampolines/wpi__math__ProfiledPIDController.hpp,sha256=jG74iO9gkDSNRPYaS60FhPZHTko--XghALPaSIfib_k,19400
wpimath/trampolines/wpi__math__Quaternion.hpp,sha256=lXot73rZNNqL_XepGTbGRuEaQ_PQrVJXxHgK76lMhkY,291
wpimath/trampolines/wpi__math__QuinticHermiteSpline.hpp,sha256=2mWYVKTjcebDanXmbwzT44OzZZfNHJY2ZjJc8NU9yn4,228
wpimath/trampolines/wpi__math__Rectangle2d.hpp,sha256=nYk32_KPxN8Hgm2UVpHqD27gTYNCN4qw2egrp3CllTQ,293
wpimath/trampolines/wpi__math__RectangularRegionConstraint.hpp,sha256=w2zKw9C50EH8dcvsj-RHrp_cCyTJMNtZKBQIRiCcshY,5903
wpimath/trampolines/wpi__math__Rotation2d.hpp,sha256=QR-6bjqhQyio-Yc1HaUTkkoyGHQuQjnJgDtjNP1IXsk,291
wpimath/trampolines/wpi__math__Rotation3d.hpp,sha256=4gxNjL-2f_WWVNp9NvgGilhF4JEnCjLx1fqFdU9mFNc,291
wpimath/trampolines/wpi__math__SimpleMotorFeedforward.hpp,sha256=o3qov4coXJVblOdsQkXIUg8ngVOcXuFlj_0oM2iKV9I,9338
wpimath/trampolines/wpi__math__SimulatedAnnealing.hpp,sha256=s5Xe6RZM7AZD2IjI4umeE_4ID222HjHIR4lfd0Soo4g,3283
wpimath/trampolines/wpi__math__SlewRateLimiter.hpp,sha256=A6EfLjOwmN8I54YiekHjkJre0bqP2z4U4r0YpCGIhjM,5122
wpimath/trampolines/wpi__math__Spline.hpp,sha256=TSdjhBA0BASvsJb2LvyGQosVRtTY3zoI2MwppXNGHJo,5444
wpimath/trampolines/wpi__math__SplineHelper.hpp,sha256=jXak_vUBS46bb-lJYG3CE34aJ-WMt3_hAHiGecbaUSU,212
wpimath/trampolines/wpi__math__SplineParameterizer.hpp,sha256=EflljU1-nPit6MGM-P_v1aytrTPW_1YkFKt_fF9yc7w,226
wpimath/trampolines/wpi__math__Spline__ControlVector.hpp,sha256=H9-SJ_lrRg4OO4pTCpMRI7hQTUCKkbpLZ3qxLzOAriM,276
wpimath/trampolines/wpi__math__SwerveDriveKinematics.hpp,sha256=LrzrDBqPbTcYHwtD-ATxQDtvo1Sl9Wkt5_-Pq1-34fQ,22706
wpimath/trampolines/wpi__math__SwerveDriveKinematicsConstraint.hpp,sha256=4dn16mE45IrR7f1oNO7MCz9gXBE1eja15skmpVnOm7I,6262
wpimath/trampolines/wpi__math__SwerveDriveOdometry.hpp,sha256=k6bpGpOe7BYIy-eVL71SB5qdQ77iIVsxIwhkgd1DMrs,2476
wpimath/trampolines/wpi__math__SwerveDriveOdometry3d.hpp,sha256=pcHgobiK-RWB6TqGeqhNmMt5cSQ6TKkEZRL6pt4PLkY,2101
wpimath/trampolines/wpi__math__SwerveDrivePoseEstimator.hpp,sha256=98A5mMJxPr4SOBRS4BSQ6TJoc-eXP-XDPGMh9nOt0xI,5348
wpimath/trampolines/wpi__math__SwerveDrivePoseEstimator3d.hpp,sha256=AC3ZTPuPhBO2uvnd9iEE8YrSPro1nfTNWeLi0ypCQj4,5319
wpimath/trampolines/wpi__math__SwerveModuleAcceleration.hpp,sha256=JVg_zF-wAWjhw7eHpZlaKqrxZUnyS-4Xyzrooh7-W0c,290
wpimath/trampolines/wpi__math__SwerveModulePosition.hpp,sha256=1WwOCcX1mF3O3IexqhFfMf0FLUylcN9_I3kUCgHEgKk,282
wpimath/trampolines/wpi__math__SwerveModuleVelocity.hpp,sha256=27XEoyp712AKmYLq-wxTZUgK2t_4jSww_TItKoyCMRw,282
wpimath/trampolines/wpi__math__TimeInterpolatableBuffer.hpp,sha256=2WF0VCDjOeMAWLRFrRyWBJ2O0Kk88Z0rS4dMCwejcX4,4041
wpimath/trampolines/wpi__math__Trajectory.hpp,sha256=mO6fWzNiWtziJOne7dQ7iRzSSN8q5FOT8-pomwIW20Y,269
wpimath/trampolines/wpi__math__TrajectoryConfig.hpp,sha256=IUiFgq2oy0MqLywN2c-EIFsU-5WUaKS5Cy1aZA6j3ko,287
wpimath/trampolines/wpi__math__TrajectoryConstraint.hpp,sha256=viRGlxo3chqGJ_RZopdG-O8Sk5Q248Jjz4PCBhFE54w,1884
wpimath/trampolines/wpi__math__TrajectoryConstraint__MinMax.hpp,sha256=jDLKThmZ_nmRWAymM2XIexIfP9yYQOWEy_aDIYN9YLE,251
wpimath/trampolines/wpi__math__TrajectoryGenerator.hpp,sha256=VhsTv2Je_VctOia12aG-zDo9zRuMc-nyc1NkZXy3oa0,360
wpimath/trampolines/wpi__math__TrajectoryParameterizer.hpp,sha256=y08qNcAUS1CNEFQT-g3TLU6n10M-1y02VFchTnm4mk8,238
wpimath/trampolines/wpi__math__Trajectory__State.hpp,sha256=VkgBWh_9fQz3SR6b2JI4akSWcik1sfps0Kk8RsT6Ptw,276
wpimath/trampolines/wpi__math__Transform2d.hpp,sha256=mt5Ajggq6z8PDovjIBpREBg7sQpkxWMVJpeqLVk7ZV4,334
wpimath/trampolines/wpi__math__Transform3d.hpp,sha256=0TOe_kCy-pi73BCGFS2jqGO3wi3YVQiO_AEkcHP-gGc,293
wpimath/trampolines/wpi__math__Translation2d.hpp,sha256=9V856vxghDnSysbWKzSJUaAV7gNPRvFe2TNYo66BMBY,326
wpimath/trampolines/wpi__math__Translation3d.hpp,sha256=54bi-cZMZ2wHxq2HRQf3R2AOrz3LTTgMjP6-jrY2zHw,326
wpimath/trampolines/wpi__math__TrapezoidProfile.hpp,sha256=ey-RsXDBSyOUj-KSGv9VQdvQD8d3xpL54QgAFSVNbTQ,7612
wpimath/trampolines/wpi__math__TrapezoidProfile__Constraints.hpp,sha256=91OjpvS-nRgTXuA-nJiNOEZYI_hy5paciuW4HbDzuy8,247
wpimath/trampolines/wpi__math__TrapezoidProfile__State.hpp,sha256=5tbJxyeLm85NE1ZMBF4vRVck6UWmEJLpozxA5ypzc6U,241
wpimath/trampolines/wpi__math__TravelingSalesman.hpp,sha256=cgnYghm68nQFilODEBm-0rKyue9S3d6IzUxlBrSb06k,220
wpimath/trampolines/wpi__math__Twist2d.hpp,sha256=0nEU8pZ4fZVYuYov-ihL5D0AwMOzJDxQvh9FHKmps9Y,254
wpimath/trampolines/wpi__math__Twist3d.hpp,sha256=fSwyX0t18n4kzYtTmdu1Lul3f0EhHaHgIw9WGKdekgc,254
robotpy_wpimath-2027.0.0a5.post1.dist-info/METADATA,sha256=vZ9z_vYp-va9xltv4gx4tsLaJwbpp-jU14l4847BzrQ,381
robotpy_wpimath-2027.0.0a5.post1.dist-info/WHEEL,sha256=353KTKtFv5jzKf9xDgZj0filE6YAfpYWbzJsyOxzkvc,97
robotpy_wpimath-2027.0.0a5.post1.dist-info/entry_points.txt,sha256=I9nzOPB7l0bBu5z51FFTDtCZ6kTbgZRFGqCmIu-Ps9Y,57
robotpy_wpimath-2027.0.0a5.post1.dist-info/RECORD,,
