What is the limit as x approaches pi/2 of x ?

The limit as x approaches pi/2 of x is pi/2

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limit as x approaches pi/2 of x

{ "query": { "display": "$$\\lim_{x\\to\\:\\frac{π}{2}}\\left(x\\right)$$", "symbolab_question": "BIG_OPERATOR#\\lim _{x\\to \\frac{π}{2}}(x)" }, "solution": { "level": "PERFORMED", "subject": "Calculus", "topic": "Limits", "subTopic": "SingleVar", "default": "\\frac{π}{2}", "decimal": "1.57079…", "meta": { "showVerify": true } }, "steps": { "type": "interim", "title": "$$\\lim_{x\\to\\:\\frac{π}{2}}\\left(x\\right)=\\frac{π}{2}$$", "input": "\\lim_{x\\to\\:\\frac{π}{2}}\\left(x\\right)", "steps": [ { "type": "step", "primary": "Plug in the value $$x=\\frac{π}{2}$$", "result": "=\\frac{π}{2}", "meta": { "title": { "extension": "Limit properties - if the limit of f(x), and g(x) exists, then: $$\\bullet\\quad\\lim_{x\\to\\:a}\\left(x\\right)=a$$ $$\\bullet\\quad\\lim_{x\\to{a}}[c\\cdot{f\\left(x\\right)}]=c\\cdot\\lim_{x\\to{a}}{f\\left(x\\right)}$$ $$\\bullet\\quad\\lim_{x\\to{a}}[\\left(f\\left(x\\right)\\right)^c]=\\left(\\lim_{x\\to{a}}{f\\left(x\\right)}\\right)^c$$ $$\\bullet\\quad\\lim_{x\\to{a}}[f\\left(x\\right)\\pm{g\\left(x\\right)}]=\\lim_{x\\to{a}}{f\\left(x\\right)}\\pm\\lim_{x\\to{a}}{g\\left(x\\right)}$$ $$\\bullet\\quad\\lim_{x\\to{a}}[f\\left(x\\right)\\cdot{g\\left(x\\right)}]=\\lim_{x\\to{a}}{f\\left(x\\right)}\\cdot\\lim_{x\\to{a}}{g\\left(x\\right)}$$ $$\\bullet\\quad\\lim_{x\\to{a}}\\left(\\frac{f\\left(x\\right)}{g\\left(x\\right)}\\right)=\\frac{\\lim_{x\\to{a}}{f\\left(x\\right)}}{\\lim_{x\\to{a}}{g\\left(x\\right)}},\\:$$where $$\\lim_{x\\to{a}}g\\left(x\\right)\\neq0$$" } } } ], "meta": { "solvingClass": "Limits", "practiceLink": "/practice/limits-practice", "practiceTopic": "Limits" } }, "plot_output": { "meta": { "plotInfo": { "variable": "x", "plotRequest": "yes" }, "showViewLarger": true } }, "meta": { "showVerify": true } }