data/mathoid/19.mml
<math
xmlns="http://www.w3.org/1998/Math/MathML" display="block" alttext="upper Z equals sigma-summation Underscript j Endscripts g Subscript j Baseline dot normal e Superscript minus beta upper E Super Subscript j">
<semantics>
<mrow data-semantic-type="relseq" data-semantic-role="equality" data-semantic-id="21" data-semantic-children="0,20" data-semantic-content="1">
<mi data-semantic-type="identifier" data-semantic-role="latinletter" data-semantic-font="italic" data-semantic-id="0" data-semantic-parent="21">Z</mi>
<mo data-semantic-type="relation" data-semantic-role="equality" data-semantic-id="1" data-semantic-parent="21" data-semantic-operator="relseq,=">=</mo>
<mrow data-semantic-type="infixop" data-semantic-role="multiplication" data-semantic-id="20" data-semantic-children="19,18" data-semantic-content="8" data-semantic-parent="21">
<mrow data-semantic-type="bigop" data-semantic-role="sum" data-semantic-id="19" data-semantic-children="4,7" data-semantic-content="2" data-semantic-parent="20">
<munder data-semantic-type="limlower" data-semantic-role="sum" data-semantic-id="4" data-semantic-children="2,3" data-semantic-parent="19">
<mo data-semantic-type="largeop" data-semantic-role="sum" data-semantic-id="2" data-semantic-parent="4" data-semantic-operator="bigop">∑
<!-- ∑ -->
</mo>
<mrow class="MJX-TeXAtom-ORD">
<mi data-semantic-type="identifier" data-semantic-role="latinletter" data-semantic-font="italic" data-semantic-id="3" data-semantic-parent="4">j</mi>
</mrow>
</munder>
<msub data-semantic-type="subscript" data-semantic-role="latinletter" data-semantic-id="7" data-semantic-children="5,6" data-semantic-parent="19">
<mi data-semantic-type="identifier" data-semantic-role="latinletter" data-semantic-font="italic" data-semantic-id="5" data-semantic-parent="7">g</mi>
<mrow class="MJX-TeXAtom-ORD">
<mi data-semantic-type="identifier" data-semantic-role="latinletter" data-semantic-font="italic" data-semantic-id="6" data-semantic-parent="7">j</mi>
</mrow>
</msub>
</mrow>
<mo data-semantic-type="operator" data-semantic-role="multiplication" data-semantic-id="8" data-semantic-parent="20" data-semantic-operator="infixop,⋅">⋅
<!-- ⋅ -->
</mo>
<msup data-semantic-type="superscript" data-semantic-role="latinletter" data-semantic-id="18" data-semantic-children="9,17" data-semantic-parent="20">
<mrow class="MJX-TeXAtom-ORD">
<mi mathvariant="normal" data-semantic-type="identifier" data-semantic-role="latinletter" data-semantic-font="normal" data-semantic-id="9" data-semantic-parent="18">e</mi>
</mrow>
<mrow class="MJX-TeXAtom-ORD" data-semantic-type="prefixop" data-semantic-role="negative" data-semantic-id="17" data-semantic-children="16" data-semantic-content="10" data-semantic-parent="18">
<mo data-semantic-type="operator" data-semantic-role="subtraction" data-semantic-id="10" data-semantic-parent="17" data-semantic-operator="prefixop,−">−
<!-- − -->
</mo>
<mrow data-semantic-type="infixop" data-semantic-role="implicit" data-semantic-id="16" data-semantic-children="11,14" data-semantic-content="15" data-semantic-parent="17">
<mi data-semantic-type="identifier" data-semantic-role="greekletter" data-semantic-font="italic" data-semantic-id="11" data-semantic-parent="16">β
<!-- β -->
</mi>
<mo data-semantic-type="operator" data-semantic-role="multiplication" data-semantic-id="15" data-semantic-parent="16" data-semantic-added="true" data-semantic-operator="infixop,"></mo>
<msub data-semantic-type="subscript" data-semantic-role="latinletter" data-semantic-id="14" data-semantic-children="12,13" data-semantic-parent="16">
<mi data-semantic-type="identifier" data-semantic-role="latinletter" data-semantic-font="italic" data-semantic-id="12" data-semantic-parent="14">E</mi>
<mrow class="MJX-TeXAtom-ORD">
<mi data-semantic-type="identifier" data-semantic-role="latinletter" data-semantic-font="italic" data-semantic-id="13" data-semantic-parent="14">j</mi>
</mrow>
</msub>
</mrow>
</mrow>
</msup>
</mrow>
</mrow>
<annotation encoding="application/x-tex">Z=\sum _{j}g_{j}\cdot \mathrm {e} ^{-\beta E_{j}}</annotation>
</semantics>
</math>