Lamarre
Proulx,
T.C.J.:—This
is
an
appeal
by
Jean-Charles
Bernier
concerning
his
1985
taxation
year.
He
died
before
the
hearing
of
this
case,
and
so
the
pleadings
were
amended
to
change
the
name
of
the
appellant
to
the
Estate
of
the
late
Jean-Charles
Bernier.
This
request
was
made
at
the
hearing.
The
respondent
did
not
object
and
the
Court
acceded
to
the
request.
This
appeal
concerns
the
method
of
measuring
the
distance
referred
to
in
subsection
62(1)
of
the
Income
Tax
Act.
Is
this
distance
to
be
measured
in
a
straight
line
or
by
the
normal
route
used
by
the
taxpayer
to
get
to
his
place
of
work?
If
we
measure
the
relevant
distances
under
subsection
62(1)
of
the
Act
in
a
straight
line,
the
taxpayer
is
not
entitled
to
the
deduction
provided
in
that
subsection.
There
are
two
decisions
of
this
Court
on
this
point:
Robert
C.
Haines
v.
M.N.R.,
[1984]
C.T.C.
2422;
84
D.T.C.
1375,
and
Susan
Bracken
v.
M.N.R.,
[1984]
C.T.C.
2922;
84
D.T.C.
1813.
These
two
decisions
held
that
this
distance
is
to
be
measured
in
a
straight
line,
"as
the
crow
flies”.
These
decisions
reflect
the
decisions
in
two
English
cases:
Lake
v.
Butler
(1855),
24
Law
J.
Rep.
(NS)
273,
and
Jewell
and
Another
v.
Stead
(1856),
25
Law
J.
Rep.
(NS)
294.
In
both
these
English
cases
in
which
the
method
of
measuring
distances
is
discussed,
it
was
held
that
"this
distance
is
a
straight
measurement
not
by
road
or
other
method
of
transportation
between
the
two
points
but
'as
the
crow
flies'".
In
Lake
v.
Butler
the
meaning
of
the
word
distance
was
examined
in
the
context
of
the
Court's
territorial
jurisdiction.
In
Jewell
and
Another
v.
Stead,
according
to
the
case
headnote,
“a
Turnpike
Act
provided
that
no
toll
gate
should
be
erected,
nor
any
toll
taken,
within
three
miles
of
B.
It
was
held
that
the
three
miles
were
to
be
measured
in
a
straight
line
on
an
horizontal
plan,
and
not
along
the
roads".
Counsel
for
the
appellant
argued
that
using
a
straight-line
measurement
could
lead
to
absurd
results.
He
gave
me
as
an
example
the
case
of
a
taxpayer
living
on
the
shore
of
a
major
waterway
such
as
the
St
Lawrence
or
the
Ottawa
River,
whose
new
place
of
work
is
located
on
the
other
shore.
He
moves
there
because
there
is
no
bridge
in
the
vicinity.
This
taxpayer,
who
could
be
located
hundreds
of
kilometres
away
from
his
new
place
of
work
by
road,
could
not
deduct
moving
expenses
if
the
straight-line
measurement
test
is
used.
The
same
would
be
true
for
numerous
other
reasons
involving
geography
or
the
existence
of
roads.
On
this
point
he
referred
me
to
the
principles
of
interpretation
of
statutes,
and
specifically
Pierre-André
Côté's
work
entitled
The
Interpretation
of
Legislation,
published
by
Les
Éditions
Yvon
Blais.
The
following
passage
appears
at
page
355
of
that
book:
.
.
.
it
favours
the
interpretation
that
does
not
produce
unwanted
or
inequitable
results
over
one
that
does.
Mr
Justice
Cartwright,
in
Vandekerckhove
v
Township
of
Middleton
i
expressed
it
this
way;
There
is
ample
authority
for
the
proposition
that
when
the
language
used
by
the
legislature
admits
of
two
constructions
one
of
which
would
lead
to
obvious
injustice
or
absurdity
the
courts
act
on
the
view
that
such
a
result
could
not
have
been
intended.
At
pages
300
et
seq.
he
discusses
the
importance
of
the
object
in
the
interpretation
of
legislation,
and
I
quote,
at
page
302:
In
Hirsch
v
Protestant
Board
of
School
Commissioners
of
Montreal,
Mr
Justice
Anglin
cited
with
approval
the
words
of
Lord
Blackburn
in
Bradlaugh
v
Clarke:
All
statutes
are
to
be
construed
by
the
Courts
so
as
to
give
effect
to
the
intention
which
is
expressed
by
the
words
used
in
the
statute.
But
that
is
not
to
be
discovered
by
considering
those
words
in
the
abstract,
but
by
inquiring
what
is
the
intention
expressed
by
those
words
used
in
a
statute
with
reference
to
the
subject
matter
and
for
the
object
with
which
that
statute
was
made
.
.
.
.
In
A.G.
for
Canada
v.
Hallet
&
Carey
Ltd.,
Lord
Radcliffe
wrote,
at
page
449:
In
their
Lordships'
view
there
is
no
better
way
of
approaching
the
interpretation
of
this
Act
than
to
endeavour
to
appreciate
the
general
object
that
it
serves
and
to
give
its
words
their
natural
meaning
in
the
light
of
that
object.
There
are
many
so-
called
rules
of
construction
that
courts
of
law
have
resorted
to
in
their
interpretation
of
statutes,
but
the
paramount
rule
remains
that
every
statute
is
to
be
expounded
according
to
its
manifest
or
expressed
intention.
On
the
specific
point
of
the
definition
of
distance,
counsel
for
the
appellant
referred
me
to
two
American
cases:
Jennings
v.
Menaugh
et
al.,
118
Federal
Reporter
612
and
State
ex
rel
Johnson
v.
Mostad
et
al.
School
Directors
(Supreme
Court
of
North
Dakota
June
1,
1916),
158
Northwestern
Reporter
349.
The
issue
in
the
first
case
was
the
distance
from
which
a
witness
could
be
required
to
travel
to
testify
in
a
case.
It
was
decided
that
"the
distance
is
to
be
determined
by
the
ordinary,
usual
and
shortest
route
of
public
travel
and
not
by
a
mathematically
straight
line
between
the
place
of
residence
and
the
place
of
trial”.
In
the
second,
the
Court
had
to
rule
on
the
following
case:
section
18
of
the
Compiled
Laws
of
1912
provided
that
“if
a
petition
signed
by
the
persons
charged
with
the
support
and
having
the
custody
and
care
of
nine
or
more
children
of
school
age,
all
of
whom
reside
not
less
than
two
and
one
half
miles
from
the
nearest
school,
is
presented
to
the
Board,
asking
for
the
organization
of
a
school
for
such
children,
the
Board
shall
organize
such
school
and
employ
a
teacher
therefore,
.
.
.".
The
Court
expressed
one
of
the
two
questions
in
issue
as
follows:
whether
in
computing
the
distance
a
pupil
is
from
a
school
one
should
measure:
(a)
in
a
straight
line
and
as
the
bird
flies,
(b)
by
the
roads
which
are
fit
for
or
have
been
rendered
fit
for
travel,
(c)
or
by
the
roads
which
are
actually
laid
out
and
are
fit
for
travel
and
in
addition
the
section
lines
which,
though
designated
by
the
statute
to
be
highways,
have
not
yet
been
laid
out
as
such
and
are
not
reasonably
passable.
The
Court
was
of
the
opinion
that:
on
the
first
question
submitted,
we
are
of
the
opinion
that
the
Legislature
could
not
have
possibly
intended
that
the
distance
should
be
measured
in
a
straight
line
or
as
the
bird
flies.
As
Counsel
for
Respondent
has
suggested,
the
straight
line
theory
would
mean
that
a
community
on
one
side
of
the
Missouri
river
might
be
deprived
of
school
facilities
merely
because
a
school
happened
to
be
located
across
the
stream.
This
the
Legislature
could
never
have
intended.
We
are
however,
of
the
opinion,
and
hold
that
the
measure
of
distance
must
be
determined
by
the
roads
which
are
actually
travelled
or
at
present
capable
of
travel
.
.
.
.
Counsel
for
the
respondent
referred
me
to
the
case
of
Hard
v.
The
Deputy
Minister
of
Revenue
of
the
Province
of
Quebec,
[1977]
C.T.C.
441;
77
D.T.C.
5438;
[1978]
1
S.C.R.
851.
This
decision
discusses,
inter
alia,
the
weight
to
be
given
to
the
administrative
policy
of
the
Ministry
of
Revenue
when
the
wording
of
the
legislation
is
ambiguous.
Mr.
Justice
de
Grandpré
stated,
at
page
859:
Once
again,
I
am
not
saying
that
the
administrative
interpretation
could
contradict
a
Clear
legislative
text;
but
in
a
situation
such
as
I
have
just
outlined,
this
interpretation
has
real
weight
and,
in
case
of
doubt
about
the
meaning
of
the
legislation,
becomes
an
important
factor.
Unfortunately,
the
administrative
policy
in
this
matter
is
far
from
clear
to
me.
There
is
no
reference
to
the
method
of
calculating
the
distance
in
Interpretation
Bulletin
IT
178R2,
which
deals
with
moving
expenses.
In
the
pamphlet
that
Revenue
Canada
published
in
the
series
"Income
Tax-Family
Series”
the
method
of
calculating
the
moving
distance
is
explained
as
follows:
.
.
.
to
determine
whether
or
not
your
move
brings
you
at
least
40
kilometres
closer
to
your
new
location.
We
suggest
that
you
make
your
measurements
on
a
map
using
the
"straight-line"
method.
(Emphasis
added)
Were
it
not
for
the
decisions
of
my
two
colleagues
in
Haines
and
Bracken,
I
would
have
decided
the
matter
as
proposed
by
counsel
for
the
appellant.
However,
on
reading
the
decisions
of
my
colleagues
in
Haines
and
Bracken,
it
seems
clear
to
me
that
the
decision
that
the
distance
be
calculated
in
a
straight
line
is
not
in
the
nature
of
an
obiter
dictum,
but
is
a
significant,
although
not
primary,
element
in
the
ratio
decidendi
of
each
of
these
two
cases.
On
this
point
I
would
quote
Mr.
Justice
Duff
in
Stuart
v.
Bank
of
Montreal
(1909),
41
S.C.R.
516
at
534:
.
.
.
"it
is",
said
Lord
Macnaghten,
in
New
South
Wales
Taxation
Commissioners
v.
Palmer,
[1907]
AC
179,
at
p
184,
"impossible
to
treat
a
proposition
which
the
court
declares
to
be
a
distinct
and
sufficient
ground
for
its
decision
as
a
mere
dictum
because
there
is
another
ground
upon
which,
standing
alone,
the
case
might
have
been
determined."
If
I
refer
to
the
words
of
Mr.
Justice
Gerald
Fauteux
at
page
143
of
his
Livre
du
Magistrat
on
the
importance
of
consistent
decisions
within
a
court
of
first
instance,
I
find
the
following
passage:
[Translation]
A
judge
certainly
always
has
the
right,
if
not
sometimes
the
duty,
to
differ
and
to
deliver
a
judgment
that
is
contrary
to
the
case
law,
if
he
is
clearly
convinced
that
the
case
law
is
wrong
and
that
he
is
faced
with
very
strong
reasons
for
differing.
However,
these
reasons
must
be
such
as
those
described
by
Chief
Justice
McRuer
in
Regina
v.
Northern
Electric
Co
Ltd
et
al,
[1955]
3
DLR
449,
466:
I
think
that
"strong
reason
to
the
contrary"
does
not
mean
a
strong
argumentative
reason
appealing
to
the
particular
Judge,
but
something
that
may
indicate
that
the
prior
decision
was
given
without
consideration
of
a
statute
or
some
authority
that
ought
to
have
been
followed.
I
do
not
think
"strong
reason
to
the
contrary”
is
to
be
construed
according
to
the
flexibility
of
the
mind
of
the
particular
Judge.
In
the
event
that
the
judge
is
convinced,
for
the
reasons
set
out
above,
that
a
precedent
or
line
of
cases
decided
by
his
court
is
wrong,
he
could
surely
not
decide
to
follow
it
taking
as
his
guide
the
commendable
sentiment
of
collegiality
that
prevails
among
judges
of
the
same
court.
While
I
may
not
be
bound
by
the
rule
of
stare
decisis,
since
these
are
not
decisions
of
a
higher
court,
nor
can
I,
on
the
other
hand,
say
that
these
decisions
were
made
without
consideration
of
the
relevant
legislation,
since
the
same
section
of
the
Interpretation
Act
on
which
I
would
rely
in
finding
for
the
appellant
was
considered
by
the
Associate
Chief
Judge
in
the
Bracken
case.
The
section
in
question
is
section
12
(then
11)
of
the
Interpretation
Act,
R.S.C.
1985,
c.
1-21:
Every
enactment
is
deemed
remedial,
and
shall
be
given
such
fair,
large
and
liberal
construction
and
interpretation
as
best
ensures
the
attainment
of
its
objects.
In
my
view,
the
remedy
in
subsection
62(1)
should
be
interpreted
in
relation
to
the
workers,
and
the
distance
in
question
should
be
measured
by
the
worker's
normal
route
or
the
route
that
he
would
normally
take
to
go
from
home
to
his
place
of
work.
The
American
legislature
has
been
more
specific.
A
provision
of
section
217
of
the
American
Internal
Revenue
Code,
which
is
similar
to
section
62
of
the
Act,
provides
that
"the
distance
between
two
points
shall
be
the
shortest
of
the
more
commonly
travelled
routes
between
such
two
points".
However,
I
am
of
the
opinion
that
in
the
circumstances
of
this
case
I
am
bound,
in
the
interests
of
justice,
by
the
earlier
decisions
of
my
colleagues
and
must
leave
the
issue
to
be
decided
by
a
higher
court.
Stability
and
consistency
in
the
decisions
of
a
court
are
important.
On
this
point,
I
adopt
the
positions
of
my
colleague
Judge
Tremblay
in
B.B.
Fast
&
Sons
Distributors
Ltd.
v.
M.N.R.,
[1982]
C.T.C.
2002;
82
D.T.C.
1017;
[1984]
C.T.C.
626;
84
D.T.C.
6554;
[1986]
1
C.T.C.
299;
86
D.T.C.
6106,
and
Mr.
Justice
Jackett
in
Canada
Steamship
Lines
Limited
v.
M.N.R.,
[1966]
Ex.
C.R.
972;
[1966]
C.T.C.
255;
66
D.T.C.
5205.
For
the
foregoing
reasons,
the
appeal
is
dismissed.
Appeal
dismissed.
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