complementary sine integral

Summary

complementary sine integral is a function^[1].

Key Facts

• complementary sine integral's instance of is recorded as function^[2].
• complementary sine integral's different from is recorded as sine integral^[3].
• complementary sine integral's defining formula is recorded as \mathop{\mathrm{si}} z = -\frac{\pi}{2} + \mathop{\mathrm{Si}} z^[4].
• complementary sine integral's maintained by WikiProject is recorded as WikiProject Mathematics^[5].
• complementary sine integral's in defining formula is recorded as \mathop{\mathrm{si}} z^[6].
• complementary sine integral's in defining formula is recorded as \mathop{\mathrm{Si}} z^[7].