Question
Write an inequality to represent the following:
Any number greater than or equal to 5
- x > 5
- x ≥ 5
- x < 5
- x ≤ 5
Hint:
Simply use the grater than or equals to formula to find the inequality.
The correct answer is: x ≥ 5
STEP BY STEP SOLUTION
Number greater than or equals to 5
Let the number be x
The inequality is x ≥ 5.
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a is at least six.
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Literal equations use both __________ and __________. [Understanding]
Literal equations use both __________ and __________. [Understanding]
A compound inequality including “or” has the solutions of ___________.
Whenever we solve questions of inequality, we have to check for the words “and” and “or”.
A compound inequality including “or” has the solutions of ___________.
Whenever we solve questions of inequality, we have to check for the words “and” and “or”.
Solve 32 < 2x < 46.
We have to follow the rules of inequalities to solve such questions. We have to swap the inequality when we divide it or multiply it by a negative number. In such questions, we find the values of the variables which makes the statement of inequalities true.
Solve 32 < 2x < 46.
We have to follow the rules of inequalities to solve such questions. We have to swap the inequality when we divide it or multiply it by a negative number. In such questions, we find the values of the variables which makes the statement of inequalities true.
Find the area of the right-angled triangle if the height is 11 units and the base is x units, given that the area of the triangle lies between 17 and 42 sq. units
For such questions, we should check the limits of the inequality. We should check the upper limit and lower limit.
Find the area of the right-angled triangle if the height is 11 units and the base is x units, given that the area of the triangle lies between 17 and 42 sq. units
For such questions, we should check the limits of the inequality. We should check the upper limit and lower limit.
The inequality that is represented by graph 2 is ______.
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)
The inequality that is represented by graph 2 is ______.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWEAAAFCCAYAAAAgx2xPAAAYG0lEQVR4nO3df2xd5X3H8c+NfW1fO5CuWaL8QBkpIsoPOT+W4DCNoRAEhcU0qnDndvxhB4GmVkWblCpiZes6VS2oXapNoPaPocapVIkUI5RhF9EsccQ6AQaaOJGxlyqDRRBHCYGGJtfXvnG8P8I1N865P+3zfM+9z/slWUrsc+/3Oeee87nPfe5zzolNTk5OCgBgYo51AwDAZ4QwABgihAHAECEMAIYIYQAwRAgDgCFCGAAMEcIAYIgQBgBDhDAAGCKEAcAQIQwAhghhADBECAOAIUIYAAxFNoRjsZh1E0xZr7/v9QFXIhvC1ggBv1m//r7X9wkhDCByrN8EXNYnhAHAECEMAIZiUb3RZywWk0XTJk6d1vjRQUlS3fo1qlm2xHkbJLv1pz71retH4Rh0uf6E8KdSvX26tLdbE+++r/iG1ZKk9JF3FN+wWont96ph213O2iL5fRBS38/6uY7BmuU3qamjzekx6HL9a51UibiLu59V8rmXNG/3E6q/s0XSZy/C2Kv9urDz+7o8fFJzdz5i3FKgOk0/BrNDsNqPQe97wmO/eVO///o/asHBX2jOwvmB9a+cPa9zdz+kz/30e6q/47bQ2zS9vgXqU99V/aBjcHp918egy/UP/Yu5sVf7lR48EXaZsiW7XtC8J3ddE8DTzVk4X/Oe3KVk1wsOWwb4odKPwfTgCY292l/242c1hCfOnFOq55A++c6P9eF9HRpZslkfffUxjfW9NptlZs3EqdNKDwypoXVrwWUbWrcqPTCkiVOnHbQM8EM1HINjfa/po68+ppElm/XhfR365Ds/VqrnkCbOnCvq8TMaE748dFJjr/9W6TcGNP72cU18cCb3wiVOfp4s4zGlSvccUs3ym4pePr5htcaPDiphNGMCqDbp4/9T8jFY8ydLQ2zRVSXlz9NdU/9MHxtW+tiwLj27T5JUs3TR1Jf7tV9YptpVt1z38JLHhK+cPa/RF1/RxWd+rivnPy7loQUtHim/S1+ujx99XJ//96eKWvajRx9XQ+tWNW6/N+RWAX5I7v+1Uj2Hij4GXY6SjyxuCeV5b/ynv1Xiy1/8bPx7Jl/MpY8Na7x/QOP9R5U+8k7OnvAN3/6G5j7WWW6Z0Ez83wc6/+DXtfDN/df9LWhg/uxt2zX/hZ86mbfo0xcz1Pe3/sSp04HHYK76Z2/broVv/Ufo7SrFxae79Icf/CTwbzWLFii+qVl1LetV17JO8bUrr1tmRsMR8bUrFV+7Uk2PtEu6OjyR/t3/Kv3GgMZe/60uD538bOESX1AXO0GNpPi6VUq9fFgN92/Ju2zq5cOKr7nV7OQNoBrVLFui+JpbizsGew4pvuZW6c3w3xxKyp9n9k79s3bVLaq//U8V37yu6BNNQp+ilurtU83NSxVfs6KkxzFFzY+eEPWpP3b4df3+se9W7BS19OAJXTn/e9VtbFasKVFyrdCnqDVsu6vkAHap/o7b1NTZpnN3P6Sx37x53d9TLx/WubsfUlNnm7MABnxSv+V2NXW26cNtDwdO9Yr6MRhfs+LqCSZlBLDEyRpTxg6/rmRXt9LDJ1W3sVmSNP72cdVtbFbiK3+p+i23O2uL5FdPiPrUl65+ah59vjcSxyDXjpDhBXzee1/jbx2XJNVtalbNzcVPn5lNPh6E1Ke+FI1jkBCW3zsh9alPfX/qcz1hADBECAOAIUIYAAwRwggU0a8KgKoT2RC2DgHf61uzXn/f68OdyM6OAAAfRLYnDAA+IIQBwBAhDACGCGEAMBS5W97HAm4p4uwcbsPaQTLtcdmGqGwDi3XPrpvNx+0vuX8NgtbdZf2gNrioHakQDnrRY7GYk/O4LWvnaotrUdgGVuueXdtq/a3rB7XFgi9vOhmRCmHLXmeUZupl2mJ5IFixXHfrfcC6fkYm9H3a/6wCWIpYCANAdvhbfwKo2uGIQisa5oYo9rnDfme0eLFRmqiMS7seE7XaF4NywHV7LIaCTEK40EqFuSGKeR4XBx+hG22WH08tx6TZL91jOGIay4MP0eDzPhA0Dkw4hytSIWy981vXhz3LfcB6/8s1LGg1M8QXkbuAj9U8yXzfBFuPCbpsh/U81aitu8v6udrgS6fEet3NsidqIQwAPuG0ZQAwRAgDgCFCGAAMEcIAYIgQBgBDhDAAGCKEAcAQIQwAhghhVL3MRXCAKIrUtSNQnaxPR50pn69rgPARwghVlG7ZUyp6z3CBEEZoiu1BZi83/TGFetFBj81Xs5S7Nvh8mym4w5gwnJucnAwMwFyBm/2Ta7lMz3qmywCu0RNGZBQbzMU+tpxlANcIYThVynBArvFkoJowHAGn6I0C1yKEERrGXoHCGI5AqDKzFsoJ4lIeG8Zt4qc/J/OFEQZub4SKRjCi0jEcAQCGCGEAMMSYMCoawxCodPSEAcAQIQwAhghhADBECAOAIUIYAAwRwgBgiBAGAEOEMAAYIoQBwBAhDACGCGEAMEQIA4AhQhgADBHCAGCIEAYAQ4QwABgihAHAECEMAIYIYQAwRAgDgCFCGAAMRTaEY7GYdRNMWa+/7/UBVyIbwtYIAb9Zv/6+1/cJIQwgcqzfBFzWJ4QBwBAhDACGYpOTk5PWjQgSi8Vk2TTqU5/6NvUnTp3W+NFBSVLd+jWqWbbEeRtcrj8hnCW5p1vJX/YoPTAkSYqvXanG9gfUuKPNaTskvw9C6vtZP9Xbp0t7uzXx7vuKb1gtSUofeUfxDauV2H6vGrbd5awtLte/1kmViEv19inVc1Cj+w9c8/v0sWFdODas8f6jauxsU93m9UYtBKrbxd3PKvncS5q3+wnV39lyTQiOvdqvCzu/r8vDJzV35yPGLZ19hLAUGMDZMn8jhIHZl+rt06Wubi04+AvNWTj/ur/X39miP+79mc7d/ZDim9ep/o7bDFoZHu+/mEvu6c4bwBmj+w8ouafbQYsAv4y++IrmPbkrMIAz5iycr3k/fFzJrhcctswN70P40t7ig7WUZQEUNnHqtNIDQ2po3Vpw2Yb7tyg9MKSJU6cdtMwd74cjLp94t+Ayi0f6r/5jpF+K7Qu5RVdNSpLhhHXqU99F/RpJCzO1ivgiLL5htcaPDiphMGMiLE56wrFYrOSfch9Xys9kcrRg26cCGEC4ijj+P1s03GyYSY1SOQnhycnJkn/KfVwpP7HGhGpXLM/b9pHFLS42EYAijv/0kXdUt35N6NmQq36xjy2F92PCTR2F5wCPLG7RyOIWJX/2/NWPTA5+YpKzWtSnvmX9jzt2KvWrvoLHYerlw4qvudXk5I0weR/CjTvalGhvLbhcor3V5KQNoNo1drbpwq6ndOXs+ZzLXDl7Xhd2PaXGR9odtswN70NYkhLb78kbxIn2VjV1POiwRYA/6rfcrqbONp27+yGN/ebN6/4+9mq/Ptz2sJo626pujrDEacvXSO7rUbKre+q05ZqlizT3W4+qsYie8mzz8bRV6vtdP9Xbp9Hne5UePqm6jc2SpPG3jyu+8hYl2lvVcP8WZ23h2hHycyekPvWpL028977G3zouSarb1Kyam29y3gZCWH7vhNSnPvX9qc+YMAAYIoQBwBAhDACGCGEEiuhXBUDViWwIW4eA7/WtWa+/7/XhTmRnRwCADyLbEwYAHxDCAGCIEAYAQ4QwABiK3O2Ngq5M7+wcbsPaQTLtcdmGqGwDi3XPrpvNx+0vuX8Nct2VwnL7u6gdqRAOetGnbkUU8sawrJ2rLa5FYRtYrXt2bav1t64f1BYLvrzpZEQqhC17nVGaqZdpi+WBYMVy3a33Aev6GZnQ92n/swpgKWIhDADZ4W/9CaBqhyMKrWiYG6LY5w77ndHixUZpojIu7XpM1GpfDMoB1+2xGAoyCeFCKxXmhijmeVwcfIRutFl+PLUck2a/dI/hiGksDz5Eg8/7QNA4MOEcrkiFsPXOb10f9iz3Aev9L9ewoNXMEF9E7gI+VvMk830TbD0m6LId1vNUo7buLuvnaoMvnRLrdTfLnqiFMAD4hNOWAcAQIQwAhghhADBECAOAIUIYAAwRwgBgiBAGAEOEMAAYIoQBwBAhDC9krkYGRE2kLuCD6mV9XYByVWq7UTnoCSN02ReCyfxk/z6qKrXdqCz0hBGqYq/Elb3c9McU6o0GPTZfTcvb5wDTEcIwUUxA5lo2190msn83k2UKtRGYTYQwIiUo+Ir9+F9MaM4kWH2+8DjCQwjDuVKGA4KCz2JMlgBGWPhiDs5VWpARwAgTIYxQVfqMAgIYYWM4AqHLzFooJ4hLeez0ZWYanNnPN9vPDWRwjzlUPHqrqGQMRwCAIUIYAAwxJoyKxzAEKhk9YQAwRAgDgCFCGAAMEcIAYIgQBgBDhDAAGCKEAcAQIQwAhghhADBECAOAIUIYAAwRwgBgiBAGAEOEMAAYIoQBwBAhDACGCGEAMEQIA4AhQhgADBHCAGAokiEci8Wsm2DKev19rw+4FMkQtkYI+M369fe9vm8IYQCRYv0m4Lo+IQwAhghhADAUm5ycnLRuxHSxWEyWzaI+9alvU3/i1GmNHx2UJNWtX6OaZUuct8H1+hPCn0ru6Vbylz1KDwxJkuJrV6qx/QE17mhz2g7J74OQ+n7WT/X2afT5XqUHf6f4htWSpPSRdxTfsFqJ7feqYdtdztriev1rnVWKqFRvn1I9BzW6/8A1v08fG9aFY8Ma7z+qxs421W1eb9RCoLpd3P2sks+9pHm7n1D9nS3XhGCq55A++e6/6vLwSc3d+YhxS8NBCAcEcLbR/QekhnpCGAhBqrdPl7q6teDgLzRn4fzr/t7QulV1Let07u6HFN+8TvV33GbQynCF+sVcqrdP6cETYZaYkeSe7rwBnDG6r0fJPd0OWgT4ZfTFVzTvyV2BAZwxZ+F8zXtyl5JdLzhsmTuzFsITZ85d/ejwnR/rw/s6NLJksz5+9HGN9b02WyVm3aW9xQdrKcsCKGzivfeVHhhSQ+vWgss2tG5VemBIE6dOO2hZYenBExp7tV+Tl0Zn/FxlD0dMvPe+Un2vKf3GgMbfPq6JD84ELheLx6USJz9PSiU/phwLpv1/ZHFLzmUvn3hXk59cVOzGueE2CvBEevB3qtvUXPTy8Q2rNX50UAmDGRPTjfW9pj/84CeSpNpVt6j+zzeprmW94puaVbNoerLkV1IIXzl7XqMvvqKLz/xcV85/XNRjPvnnf9MnecItY/FIfylNCcXikf68QazaGmdn0/h21hD1/auf3P9rTU5MBNYK+t1Hjz6uxPZ7Q29XUZ3Ap7um/nl56KQuD53UpWf3SZJqli6amtVR+4Vlql11S96nKnuKWnrwhMZfO6Lx/qNKv3VcE2fOBS53w7e/obmPdZZTwrl8AVy7YrkWHH7OSTt8nKJEff/qT5w6rfMPfl0L39xfXH0Hbwx5O2Flql2xXI1f+5ISX/5i4Nh32cMR8TUrFF+zQk2PtEuSJj44o/G3jyv9xoDGXv+tLg+d/GzhEl9QVztBck+3Ljzxo6KWbepwP18YqGY1y5YovuZWpV4+rIb7t+RdNtVzSKMdO/VHe3eH2qZiP5FffLprajhiuppFCxTf1Ky6lvWqa1mn+NqVeZ9r1qao1SxdpMTSRUp86Z6p340dfl1zFnx+tkrMusYdbRr777eU+lVf3uUS7a0mJ20A1S7xlW26sOsp1W1szjlD4srZ87rw9z/U5376PanrX0JvU1GdwGf2Tv0zMyYc39Rc1ll+oc4Trt9ye5hPPytu/IdvKnZDk0b39QT+PbH9HjV1POi4VYAfGrbdpcvDJ/XhtoenTtbIlnr5sC7sekpNnW2RmiNcf9efKb52leo2NivWlJjRc3Ha8qeuO2153So1drapsb3VaTskf8YEqU/9jMyZq+NHBlW38eqMifG3jyu+8hY1drY57dBx7Qj5uRNSn/rU//QCPv0DkqS6Tc2qufkm520ghOX3Tkh96lPfr/pcTxgADBHCAGCIEAYAQ4QwrhPBrwmAqhXJELYOAd/rW7Nef9/rw61Izo4AAF9EsicMAL4ghAHAECEMAIYIYQAwFKm7LQddTd/V94aWtYNk2uP0HPaIbAOLdc+um83H7S+5fw1y3cnDcvu7qh2ZEA560WOxmJPzuC1r52qLa1HYBpa39LFef+v6QW2x4MubTrbIhLBlrzNKs/QybbG+x5gFy3W33ges62dkQt+n/c8ygKUIhTAAZIe/9SeAqh2OKLSiYW6IYp877HdGqxcbxYvKuLTrMVGrfTEoB1y3x2ooyHkIF1qpMDdEMc/j4uAjdKPN8uOp5Zg0+6UNhiOyWI8NwZ7P+0DQODDhHL7IhLD1zm9dH/Ys9wHr/S/XsKDVzBCfROoCPlbzJPN9E2w9JuiyHdbzVKO27i7r52qDL50S63U3PUchSiEMAL7htGUAMEQIA4AhQhgADBHCAGCIEAYAQ4QwABgihAHAECEMAIYIYXgjc0EcIEoic+0IVD/rU1PLVantRmWgJwwnsq9FkPnJ/n1UVWq7UTnoCSN0xV4MJnu56Y8p1BsNemy+mpZ3cACyEcIwU0xA5lo21wXPs383k2UKtRGYLYQwIico+Ir9+F9MaJYbrPSeEQZCGCZKCbRct4N3rdjeM1AKvpiDiUoJMKa1IWyEMELHjAIgN4Yj4ERm1kI5QVzKY2f7lvG5aldKTx7Rx+2NUBV8v1kkKhfDEQBgiBAGAEOMCaMqMAyBSkVPGAAMEcIAYIgQBgBDhDAAGCKEAcAQIQwAhghhADBECAOAIUIYAAwRwgBgiBAGAEOEMAAYIoQBwFAkQ9j32+BYr7/v9QGXIhnC1ggBv1m//tT36/gjhAEgi+s3AUIYAAwRwgBgiBAGAEORvOV9LBZzfs+w5J5uJX/Zo/TAkCSpZukizf3Wo2psb3XaDslm/alPfcv604+/+LpVavyrVjXuaHPaDsn9+nsfwuNvHFWyq1uj+w8E/j2x/R41drapbvN6J+2R/DwIqe9n/VRvn1I9B70+/ry/23K+AJY09TeXOwHgi9Hne5X69X/l/vv+A1JDfVUff16PCSf35A/gjNH9B5Tc0+2gRYA/Lu5+Nm8AZ4zu66nq48/rEL60t/gXtpRlARQ2+tJ/Fr1sNR9/Xo8JjyzZXHCZxSP9obcDgDSyuCXv3xcNH1Tsxrmht6PqxoTLPfsk7LNWitnIBDDgzuKR/vxBXFvj7Gy2cuuUE96hh3A5jXL1TlS7Yrkun3g3599HFrcQxIAj+QK4dsVyxRoTTnKh6nrCUdbU0aYLT/wo7zKZHeOGb39Dc7/Z4aJZXk1Ror6/9ZN7ugsefxmNX/tSyK2x4/UXc4072tRw718UXC7R3uosgAFfNO5oU6KIk6ES7a1q+pu/dtAiG16HsCTN/buH8+4Iie33qKnjQYctAvzR1PFgweOv8asPOGyRe17PjsiW3NejZFf3Z6dNrl2pxvYHvDhtkvrUt67PacsR4+NOSH3qU9/P+t4PRwCAJUIYAAwRwgBgiBAGAEOEMK4Twe9qgaoVyRC2DgHf61uzXn/f68OtSE5RAwBfRLInDAC+IIQBwBAhDACGCGEAMBSp6wkHXc3e1feGlrWDZNrj9EIiEdkGFuueXTebj9tfcv8a5LqTheX2d1U7MiEc9KLHYjEnF9OwrJ2rLa5FYRtYrXt2bav1t64f1BYLvrzpZItMCFv2OqM0Sy/TFssDwYrlulvvA9b1MzKh79P+ZxnAUoRCGACyw9/6E0DVDkcUWtEwN0Sxzx32O6PVi43iRWVc2vWYqNW+GJQDrttjNRTkPIQLrVSYG6KY53Fx8BG60Wb58dRyTJr90gbDEVmsx4Zgz+d9IGgcmHAOX2RC2Hrnt64Pe5b7gPX+l2tY0GpmiE8idQEfq3mS+b4Jth4TdNkO63mqUVt3l/VztcGXTon1upueoxClEAYA33DaMgAYIoQBwBAhDACGCGEAMEQIA4AhQhgADBHCAGCIEIYXMtdhAKImMqcto7pZnxE1G3w/vRbhoCeM0GWHV+Yn+/eVoJLaispCTxihKrb3mL3c9McU6kUHPTZfzVIvHO7j3SbgDj1hmMjuEWfLFbjF9KIzYTnTZYKWB8JCTxiRUmwwF/vYcpbJrksAI2yEMJwrZTgg112IXcnVm57eJqBchDCcq5TxVcsLncMfjAkjVJU4EwJwiZ4wQpfp+ZYTxKU8lrtYoxJxZw1UPIYJUMkYjgAAQ4QwABhiTBgVj2EIVDJ6wgBgiBAGAEOEMAAYIoQBwND/A678pe+Y3VKLAAAAAElFTkSuQmCC)
The solution of 2 < x ≤ 8 is ________.
The solution of 2 < x ≤ 8 is ________.
Write the inequality represented by the graph
![](data:image/png;base64,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)
Write the inequality represented by the graph
![](data:image/png;base64,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)
Write an inequality to represent the following:
Any number greater than 5
It is used most often to compare two numbers on the number line by their size.
Write an inequality to represent the following:
Any number greater than 5
It is used most often to compare two numbers on the number line by their size.