From 25985edcedea6396277003854657b5f3cb31a628 Mon Sep 17 00:00:00 2001 From: Lucas De Marchi Date: Wed, 30 Mar 2011 22:57:33 -0300 Subject: Fix common misspellings Fixes generated by 'codespell' and manually reviewed. Signed-off-by: Lucas De Marchi --- drivers/mtd/devices/docecc.c | 4 ++-- 1 file changed, 2 insertions(+), 2 deletions(-) (limited to 'drivers/mtd/devices/docecc.c') diff --git a/drivers/mtd/devices/docecc.c b/drivers/mtd/devices/docecc.c index a99838bb2dc..37ef29a73ee 100644 --- a/drivers/mtd/devices/docecc.c +++ b/drivers/mtd/devices/docecc.c @@ -109,7 +109,7 @@ for(ci=(n)-1;ci >=0;ci--)\ of the integer "alpha_to[i]" with a(0) being the LSB and a(m-1) the MSB. Thus for example the polynomial representation of @^5 would be given by the binary representation of the integer "alpha_to[5]". - Similarily, index_of[] can be used as follows: + Similarly, index_of[] can be used as follows: As above, let @ represent the primitive element of GF(2^m) that is the root of the primitive polynomial p(x). In order to find the power of @ (alpha) that has the polynomial representation @@ -121,7 +121,7 @@ for(ci=(n)-1;ci >=0;ci--)\ NOTE: The element alpha_to[2^m-1] = 0 always signifying that the representation of "@^infinity" = 0 is (0,0,0,...,0). - Similarily, the element index_of[0] = A0 always signifying + Similarly, the element index_of[0] = A0 always signifying that the power of alpha which has the polynomial representation (0,0,...,0) is "infinity". -- cgit v1.2.3-18-g5258