Since this Q&A is a popular Google search result but the answer is a bit slow for a large matrix and @raymkchow version is slow with NAs i propose a new version using exponential search and `data.table`

power.

This a function I implemented in dataPreparation package.

First build an exemple data.table, with more lines than columns (which is usually the case) and 10% of NAs

```
ncol = 1000
nrow = 100000
df <- matrix(sample(1:(ncol*nrow),ncol*nrow,replace = FALSE), ncol = ncol)
df <- apply (df, 2, function(x) {x[sample( c(1:nrow), floor(nrow/10))] <- NA; x} ) # Add 10% of NAs
df[,sample(1:ncol,70,replace = FALSE)] <- rep(1,times = nrow) # df is a large matrix
df <- as.data.table(df)
```

Then benchmark all approaches:

```
time1 <- system.time(df1 <- df[,apply(df, 2, var, na.rm=TRUE) != 0, with = F]) # the first method
time2 <- system.time(df2 <- df[,!apply(df, MARGIN = 2, function(x) max(x, na.rm = TRUE) == min(x, na.rm = TRUE)), with = F]) # raymkchow
time3 <- system.time(df3 <- df[,apply(df, 2, function(col) { length(unique(col)) > 1 }), with = F]) # Keith's method
time4 <- system.time(df4 <- df[,-whichAreConstant(df, verbose=FALSE)]) # My method
```

The results are the following:

```
time1 # Variance approch
# user system elapsed
# 2.55 1.45 4.07
time2 # Min = max approach
# user system elapsed
# 2.72 1.5 4.22
time3 # length(unique()) approach
# user system elapsed
# 6.7 2.75 9.53
time4 # Exponential search approach
# user system elapsed
# 0.39 0.07 0.45
all.equal(df1, df2)
# [1] TRUE
all.equal(df3, df2)
# [1] TRUE
all.equal(df4, df2)
# [1] TRUE
```

`dataPreparation:whichAreConstant`

is 10 times faster than the other approachs.

Plus the more rows you have the more intersting it is to use.

`x`

. Right now we don't even know if your`x`

is numeric, let alone a matrix. Now, if it is a matrix,`y <- x[,sd(x)!=0]`

will suffice. – Carl Witthoft Feb 25 '13 at 14:19`x[,apply(x, 2, function(col) { length(unique(col)) > 1 })]`

– Keith Hughitt Jul 26 '15 at 11:40