Shamrock Shuffle 5k. Race 3 of the Tour de Patrick.
The Guinness Shamrock Shuffle 5k is the final race in the Tour de Patrick. The 5k will start and finish at North Kingstown High School located at 150 Fairway Dr, North Kingstown, RI 02852 on March 25 at 11:00 a.m.
Team Registration Style
Please select a method of registration below:
Join a Team:Pick from a list of team names on the next page and join your team.
Create a Team:Once you create a team, participants can join your team under the "join a team" option above.
Individual Registration:Register as an individual participant.
In consideration of the acceptance of this entry. I hereby for myself, heirs, executors, and administrators, waive and release any and all rights and claims for damages I may have against the Shamrock Shuffle 5K, Ground Control Events L.L.C. and its respective, parents, subsidiaries, affiliates, successors and assigns, Ground Control Events L.L.C., the City of North Kingstown, USATF, sponsors, race officials, organizers and volunteers associates with this event for any injury that may occur as a result of my participation in this event. Further, I agree that any pictures or photographs taken of me by the Shamrock Shuffle 5K or Ground Control Events L.L.C., or their respective agents, in connection with this event are owned by the Shamrock Shuffle 5k and Ground Control Events L.L.C. , and I waive all rights to inspect or approve the final product. I hereby irrevocably grant to the Shamrock Shuffle 5K and Ground Control Events L.L.C. or their respective assigns, the right and permission to use or license the use my name, likeness, voice, image or photograph of me, gathered in connection with this event, in any media or manner for the purpose of promotion of the Shamrock Shuffle 5k and Ground Control Events L.L.C. , and their events and programs, including this event. *If this release is for a minor, I confirm that I am the legal parent or guardian of the minor named below. I consent to the foregoing on behalf of such minor and personally join in the affirmance of representations set forth above.