A brief glimpse into the past

Iowa State men's basketball press conference after Sweet 16 loss to Illinois
Iowa State men's basketball press conference after Sweet 16 loss to Illinois

Iowa State men's basketball coach T.J. Otzelberger answers questions from reporters following the Cyclones' 72-69 loss to Illinois ...



En vivo | Red Sox vs Mariners | Comentarios | Jueves 28 de Marzo 2024
En vivo | Red Sox vs Mariners | Comentarios | Jueves 28 de Marzo 2024

Red Sox @ Mariners T-Mobile Park | Seattle, WA Marzo 28th, 2024 - 7:10 pm Quédate con nosotros en este primer juego de ...



Don't Forget That the Phoenix Suns Were Built To Beat the Denver Nuggets
Don't Forget That the Phoenix Suns Were Built To Beat the Denver Nuggets

The Phoenix Suns beat the Nuggets in Denver again, a reminder that this matchup was at the core of how they handled their ...



BALL DON'T LIE: Texas Rangers vs Chicago Cubs
BALL DON'T LIE: Texas Rangers vs Chicago Cubs

Opening Day 2024 Cubs scored on what was ultimately ruled a Passed Ball on Jonah Heim to take the lead. But Ball don't lie.



Don't Tell Mama! Sweet 16 Picks - East and West Regions
Don't Tell Mama! Sweet 16 Picks - East and West Regions

We've got no Cinderellas in the Sweet 16 this year but we think that will lead to tighter battles. We have a championship rematch ...



đź”´ En Vivo: New York Yankees vs Houston Astros / OPENING DAY 2024
đź”´ En Vivo: New York Yankees vs Houston Astros / OPENING DAY 2024

Cuáles serán las alineaciones? New York Yankees Alineación 2B G. Torres R RF Juan Soto L CF Aaron Judge R DH G. Stanton ...



Team, Place & City Details

Federer–Nadal rivalry
Federer–Nadal rivalry

The Federer–Nadal rivalry is between professional tennis players Roger Federer and Rafael Nadal, two of the greatest tennis players of all time. They have played each other 40 times, with Nadal leading the head to head 24–16.

Djokovic–Federer rivalry
Djokovic–Federer rivalry

The Djokovic–Federer rivalry is a tennis rivalry between two professional tennis players, Novak Djokovic and Roger Federer. They have faced each other 50 times with Djokovic leading their matchups 27–23.

Roger Federer
Roger Federer

Roger Federer is a Swiss professional tennis player who is ranked world No. 4 in men's singles tennis by the Association of Tennis Professionals (ATP).

Big Four (tennis)
Big Four (tennis)

In tennis, the quartet of men's singles players comprising Roger Federer, Rafael Nadal, Novak Djokovic, and Andy Murray was often referred to as the Big Four until 2017. They have dominated the sport among them since 2004 in terms of ranking and tournament victories, including Grand Slam tournaments and ATP Masters 1000 events, as well as the ATP Finals, the ATP Tour 500 series and the Olympic Games.

Roger Federer career statistics

This is a list of the main career statistics of Swiss professional tennis player Roger Federer. All statistics are according to the ATP Tour website.

Match for Africa

The Match for Africa series is a recurring set of tennis exhibition matches. They are organized by Swiss player Roger Federer to raise money for the Roger Federer Foundation.

Federer–Roddick rivalry
Federer–Roddick rivalry

The Federer–Roddick rivalry was a rivalry between two professional tennis players, Roger Federer of Switzerland and Andy Roddick of the United States. The two met 24 times in official Association of Tennis Professionals matches, and Federer led 21–3, making Roddick the player with the third-most tournament defeats to Federer in the ATP circuit (Novak Djokovic and Stan Wawrinka have lost to Federer on 23 occasions, but Djokovic currently holds a positive record against him).

Sandgren

Sandgren is a surname.

Michelle Federer

Michelle Federer is an American film and theatre actress.

Federer–Morse theorem

In mathematics, the Federer–Morse theorem, introduced by Federer and Morse , states that if f is a surjective continuous map from a compact metric space X to a compact metric space Y, then there is a Borel subset Z of X such that f restricted to Z is a bijection from Z to Y. Moreover, the inverse of that restriction is a Borel section of f - it is a Borel isomorphism.