Brown and Jeffrey are Tied
Toronto, October 19th – In a random sampling of public
opinion taken by The Forum Poll™ among 647 Brampton voters, amongst those
decided and leaning, if an election were held today, Patrick Brown would secure
support from 4 in 10 (40%), the same proportion as Linda Jeffrey (40%)
1 in 10 respondents (7%) support John Sprovieri and (5%) support
Wesley Jackson.
A few support Bal Gosal (4%), Vinod Kumar Mahesan (4%), and Mansoor
Ameersulthan (1%).
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)
Brown and Jeffrey also tied on positive
and negative feelings
A little over
one-third of respondents (35%) have a “negative” opinion of Patrick Brown. Likewise,
3 in 10 (34%) of respondents have a “negative” opinion of Linda Jeffrey. About
4 in 10 (38%) of respondents have a “positive” opinion of Patrick Brown and (38%)
“positive” opinion of Linda Jeffrey.
“Brown and Jeffrey are completely even going
into the final weekend so the race is all going to come down to who can get
their vote out most effectively,” said Dr. Lorne Bozinoff, President of Forum
Research.