Naomi Broady says the individuals who assume Emma Raducanu’s US Open victory was nothing however luck merely “don’t understand tennis” as the previous British tennis participant insists that pulling off what the 22-year-old did may by no means be a fluke.
Three and a half years in the past, the present world No. 56 wrote tennis historical past when she grew to become the first-ever qualifier to win a Grand Slam.
Throughout that run, the Briton received a complete of 10 matches – three qualifying and 7 major draw – and all of her wins impressively got here in straight units.
Emma Raducanu© YouTube screenshot
Since then, Raducanu hasn’t lifted any trophies – and since there was a lot consideration on her – she additionally grew to become one of the crucial criticized and scrutinized gamers on the Tour.
And one of many nastiest labels she has acquired is the one claiming that she is “a one-Slam wonder” who won’t ever once more come near doing something massive.
Broady: Individuals who say that about Raducanu do not perceive tennis
“People who have that attitude and say Emma got lucky when we won the US Open don’t understand tennis,” the 34-year-old advised Tennis365
“You hear them say she is a one-Slam surprise and it was a fluke that she received the US Open.
“In case you perceive tennis, you’ll know that isn’t potential. You’ll be able to’t come by means of qualifying, win seven matches with out dropping a set and win a Grand Slam by luck.
“She has the extent and he or she must get again there and it’s extremely tough not to take a look at these articles on-line and get dragged into the negativity.”
In the same interview, Broady noted that Raducanu probably made her circle smaller because she wanted to “have that safety” around her.
Also, the former British player added that the 22-year-old “has the expertise” and that she is going to finally get to the place she desires to be together with her profession.
In the meantime, Raducanu is enjoying the Abu Dhabi Open as a wildcard, the place she meets Marketa Vondrousova within the first spherical.
