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 (comp!)
zmadu modal, 2nd place (relative!) more than ...; usually a sumti modifier.
semaunai (comp!)
zmadu modal, 2nd place (relative!) not more than ...; usually a sumti modifier.
temau (comp!)
zmadu modal, 3rd place (relative!) more than/exceeding in property ...
vemau (comp!)
zmadu modal, 4th place (relative!) more than/exceeding by amount ...
ctenilteikezraifau
f1 = r1 = x1 (event; perhaps: spacetime coordinates) is a solstice of extreme r3 = x2 ("ka" construct or season; default: "ka zmadu", which means "Winter solstice", unless context makes this interpretation untenable) at location/of or for celestial body/object d3 = x3 with respect to orbit/sun x4.
dornilteikezraifau
f1 = r1 = x1 (event; perhaps: spacetime coordinates) is a solstice of extreme r3 = x2 ("ka" construct or season; default: "ka zmadu", which means "Summer solstice", unless context makes this interpretation untenable) at location/of or for celestial body/object d3 = x3 with respect to orbit/sun x4.
grafyjbirai
x1 (node in graph) is among the very nearest nodes to x2 (node in same graph), such that they are path-connected, along path(s) or paths of type x3 (default: directed graph geodesics from x2 to candidate other nodes, such that each of these candidates (plus x1) are pairwise distinct from x2) according to edge weighings x4 in connected graph component x5, with nearness standard/satisfying other conditions x6, the extreme x7 (default: ka zmadu, implying most-near) being amongst set/range x8 of candidate nodes.
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 x52th (li; must be 1 or 2) argument [see note] of this selbri (which) 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 separated/classified by property z3=d3 by amount z4.
facyborselkaizilkanpyborselkaimau'yraunzu
x1 is so x2 (ka) that x3 (nu); x1=ckajiZ1=ckajiP1=raunzu1 satisfies property x2=ckajiZ2=fatci1=raunzu2=zmadu2 enough that x3=raunzu3, where ckajiP2=kanpe2=zmadu2.
glamau
g1=z1 is hotter than z2 by standard g2 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.
nalme'a
m1 is not less than/more than or equal to m2 in property/quantity m3 (ka/ni) by amount m4
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.
pi'izma
x1 exceeds x2 is aspect x3 (ka/ni) by factor x4; x1 is/does x3 x4 times as much as x2 is/does.
rajyclamau
z1=c1=s1 is taller than z2 by amount z4.
sapmau
s1=z1 is simpler than z2 in property s2=z3 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
xoi'ei'a
Toggles grammar so that every mention of a number n is interpreted as "at least n".
dunlini
x1 and x2 satisfy predicate x3 to the same extent
karbina
x1 and x2 are elements of the same partially-ordered set x3 (see notes) such that x1 and x2 cannot be meaningfully compared via said relation/in said property.
nanjmau
x1 is older than x2 by x3 years.
zmaduje
x1 is more than/greater than/exceeds x2 in property x3 (ka) and the x4th (li; 1 or 2) argument of this selbri actually has/is/expresses/attains property x3 according to x5.