zmadu -zma-mau- gismu

x1 exceeds/is more than x2 in property/quantity x3 (ka/ni) by amount/excess x4.

Also positive (= nonmau). See also cmavo list mau, mleca, zenba, jmina, bancu, dukse, traji.


In definition:

traji
x1 is superlative in property x2 (ka), the x3 extreme (ka; default ka zmadu) among set/range x4.
mau
zmadu modal, 1st place (a greater) exceeded by ... ; usually a sumti modifier.
semau
zmadu modal, 2nd place (relative!) more than ...; usually a sumti modifier.
semaunai
zmadu modal, 2nd place (relative!) not more than ...; usually a sumti modifier.
temau
zmadu modal, 3rd place (relative!) more than/exceeding in property ...
vemau
zmadu modal, 4th place (relative!) more than/exceeding by amount ...
kemnilzilcmikezrai
x1 (set) has the most extreme cardinality, in direction x2 (default: ka zmadu), among x3 (set of sets)
momrai
x1=traji1=moi1 is the x2=moi(-1)th (li) most extreme member of set/range x5=traji4=moi2 (set; possibly ordered) in property/ordered according to measure of property x3=traji2 \sim moi (ka) measuring from the x4 = traji3-est/utmost (ka; default: ka zmadu) member, which/who has a similar ordinality count of x6 (li) in the same set by the same ordering.
nelrai
n1 is most fond of n2=t1 (object/state) from set t4, due to extreme t3 (ka; default ka zmadu).
rairpe'o
x1=t1=p1 is the best friend (/"bestie"/"BFF") of x2=p2 among set of friends x3=t4 in extreme x4=t3 (default ka zmadu).
trajije
x1=traji1 is superlative in property x2=traji2, the x3=traji3 extrema (ka; default: ka zmadu), among set/range x4=traji4, and - moreover - (there exists at least one member of) the ((x5)^2)th (li; 1 or 2) argument [see note] of this selbri actually has/is/attains said property x2 according to standard x6.

In notes:

bancu
x1 exceeds/is beyond limit/boundary x2 from x3 in property/amount x4 (ka/ni).
dukse
x1 is an excess of/too much of x2 by standard x3.
jmina
x1 adds/combines x2 to/with x3, with result x4; x1 augments x2 by amount x3.
karbi
x1 [observer] compares x2 with x3 in property x4 (ka), determining comparison x5 (state).
mleca
x1 is less than x2 in property/quantity x3 (ka/ni) by amount x4.
zenba
x1 (experiencer) increases/is incremented/augmented in property/quantity x2 by amount x3.
bermau
b1=z1 is farther north than b2=z1 according to frame of reference b3 by distance/gap/margin z4.
bramau
z1 is bigger than z2 in dimension b2 by margin z4.
cmamau
z1 is smaller than z2 in dimension c2 by margin z4.
darmau
z1=d1 is farther from z2=d2 in property z3=d3 by amount z4.
datmau
z1=d1 is a plurality of/more than all other subgroups of z2 as seperated/classified by property z3=d3 by amount z4.
jarmau
z1=j1 is firmer/tougher/harder/more resistant than z2 by amount z4.
matmau
x1 is more appropriate than x2 to x3 in property x4
maudji
d1 prefers d1=m1 (event/state) to m2 for purpose d3 by amount/excess z4.
meizma
x1 is more numerous than x2; x1 has a greater cardinality than x2
mlemau
z1=m1 is more beautiful than z2 to m2 in aspect m3 (ka) by amount z4.
nitmau
z1=c1 is lower than z2 beneath c2 in frame of reference c3 by amount/excess z4.
nonmau
z1 (number) is greater than 0 by amount z4 (number); z1 is a positive number.
rajyclamau
z1=c1=s1 is taller than z2 by amount z4.
selzaumi'o
m1=z2 is popular among mass m2=z1.
sormau
x1 is more numerous than x2
sudmau
z1=s1 is drier than z2 by amount z4 of liquid s2.
tolmlemau
z1=m1 is uglier/[more unsightly] than z2 to m2 in aspect m3 (ka) by amount z4.
tolmlerai
m1=t1 is the ugliest/[most unsightly] among set/range t3 to m2 in aspect m3 (ka) by aesthetic standard m4.
vozmau
x1=m4 is the excess amount by which x2=m1 exceeds x3=m2 in property/quantity x4=m3 (ka/ni).
xagmau
xa1=z1 is better than z2 for xa2 by standard xa3, by amount z4.
xauzma
xa1=z1 is better than z2 for xa2 by standard xa3, by amount z4.
xlamau
x1=m1 is worse than m2 for x2 by standard x3, by amount m3.
zanmau
zm1=za1 is better than zm2 in property za2 according to standard za3 by amount zm4.
zmaroi
x1 happens more often than x2 in interval x3
zmaduje
x1 is more than/greater than/exceeds x2 in property x3 and the x4th (li; 1 or 2) argument of this selbri actually has/is/attains property x3 according to x5.