Question
Solve each inequality and graph the solution :
x-8.4≤2.3
Hint:
Linear inequalities are expressions where any two values are compared by the inequality symbols<,>,≤&≥ .
We are asked to solve the inequality and graph it.
The correct answer is: x≤10.7
Step 1 of 2:
Rearrange the inequality and solve it;
![table attributes columnalign right left right left right left right left right left right left columnspacing 0em 2em 0em 2em 0em 2em 0em 2em 0em 2em 0em end attributes row cell x minus 8.4 less or equal than 2.3 end cell row cell x less or equal than 2.3 plus 8.4 end cell row cell x less or equal than 10.7 end cell end table](data:image/png;base64,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)
Step 2 of 2:
The graph of the inequality corresponding to the solution is:
![](data:image/png;base64,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)
Whenever we use the symbol ≤ or ≥ , we use the endpoint as well. So, we use complete line to graph the solution.
Related Questions to study
Jeremy deposited x dollars in his investment account on January 1, 2001. The amount of money in the account doubled each year until Jeremy had 480 dollars in his investment account on January 1,2005 . What is the value of x ?
Jeremy deposited x dollars in his investment account on January 1, 2001. The amount of money in the account doubled each year until Jeremy had 480 dollars in his investment account on January 1,2005 . What is the value of x ?
Solve each inequality and graph the solution :
0.25x>0.5
Note:
When we have an inequality with the symbols < or > , we use dotted lines to graph them. This is because we do not include the end point of the inequality.inequality.
Solve each inequality and graph the solution :
0.25x>0.5
Note:
When we have an inequality with the symbols < or > , we use dotted lines to graph them. This is because we do not include the end point of the inequality.inequality.
A bricklayer uses the formula
to estimate the number of bricks, n , needed to build a wall that is l feet long and h feet high. Which of the following correctly expresses l in terms of n and h ?
A bricklayer uses the formula
to estimate the number of bricks, n , needed to build a wall that is l feet long and h feet high. Which of the following correctly expresses l in terms of n and h ?
Solve each inequality and graph the solution :
-3x>15
Note:
When we have an inequality with the symbols< or > , we use dotted lines to graph them. This is because we do not include the end point of the inequality.
Solve each inequality and graph the solution :
-3x>15
Note:
When we have an inequality with the symbols< or > , we use dotted lines to graph them. This is because we do not include the end point of the inequality.
A school district is forming a committee to discuss plans for the construction of a new high school. Of those invited to join the committee,15
are parents of students,45
are teachers from the current high school, 25% are school and district administrators, and the remaining 6 individuals are students. How many more teachers were invited to join the committee than school and district administrators?
A school district is forming a committee to discuss plans for the construction of a new high school. Of those invited to join the committee,15
are parents of students,45
are teachers from the current high school, 25% are school and district administrators, and the remaining 6 individuals are students. How many more teachers were invited to join the committee than school and district administrators?
If
and
what is the value of 2x - 3 ?
A) 21
B) 15
C) 12
D) 10
Note:
We can also solve this question graphically, The point of intersection of graphs of equationswill give us the value of x. And then by putting this value we can easily get the answer.
If
and
what is the value of 2x - 3 ?
A) 21
B) 15
C) 12
D) 10
Note:
We can also solve this question graphically, The point of intersection of graphs of equationswill give us the value of x. And then by putting this value we can easily get the answer.
Solve each inequality and graph the solution :
6x≥-0.3.
Note:
Whenever we use the symbol ≤ or ≥ , we use the endpoint as well. So, we use complete line to graph the solution.
Solve each inequality and graph the solution :
6x≥-0.3.
Note:
Whenever we use the symbol ≤ or ≥ , we use the endpoint as well. So, we use complete line to graph the solution.
MN, NQ and NQ are midsegments of △ ABC. Answer the following questions.
iii) NQ || __
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)
MN, NQ and NQ are midsegments of △ ABC. Answer the following questions.
iii) NQ || __
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)
Solve each inequality and graph the solution :
-0.3x<6.
Note:
When we have an inequality with the symbols< or > , we use dotted lines to graph them. This is because we do not include the end point of the inequality.
Solve each inequality and graph the solution :
-0.3x<6.
Note:
When we have an inequality with the symbols< or > , we use dotted lines to graph them. This is because we do not include the end point of the inequality.
MN, NQ and NQ are midsegments of △ ABC. Answer the following questions.
ii) BC || __
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)
MN, NQ and NQ are midsegments of △ ABC. Answer the following questions.
ii) BC || __
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)
Solve each inequality and graph the solution :
5x+15≤-10
Note:
Whenever we use the symbol , we use the endpoint as well. So, we use complete line to graph the solution.
Solve each inequality and graph the solution :
5x+15≤-10
Note:
Whenever we use the symbol , we use the endpoint as well. So, we use complete line to graph the solution.
MN, NQ and NQ are midsegments of △ ABC. Answer the following questions.
i) MQ || __
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)
MN, NQ and NQ are midsegments of △ ABC. Answer the following questions.
i) MQ || __
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)
Find AB if MN is the midsegment of △ ABC.
Find AB if MN is the midsegment of △ ABC.
In △ ABC, AB = 24, BC = 36, AC = 38
Find MN, NQ, and MQ.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAO0AAADFCAYAAAC4snXUAAAgAElEQVR4nO29eXxUVba3/+xzKiNJGAwBkVEZVUQBG4F2AuEyaMuoCBiGBEgIiNxW277vz4/3vrdtf+2VFrHDGAjzIONlkklQ1DghMyqjyDxPISGpqrP3+0fVOVQQFBmSqsp+/BSGVJGcOrW/e6291tprC6WUQqPRhAxGSV+ARqP5fWjRajQhhhatRhNiaNFqNCGGFq1GE2Jo0Wo0IYYWrUYTYmjRajQhhhatRhNiaNFqNCGGFq1GE2Jo0Wo0IYYWrUYTYmjRajQhhhatRhNiaNFqNCGGFq1GE2Jo0Wo0IYYWrUYTYmjRajQhhhatRhNiaNFqNCGGFq1GE2Jo0Wo0IYYWrUYTYmjRajQhhqukL0BTDChQzpcKhIVAASZgIErw0jS/Hy3aMEABCgkI/39FngAkSoLCwIuFMAsQwg0qBlPFILS/FVLoj6sUoJQXRSFSWUhpIIgAIgCBNrOhhxZt2GBwWYHq8kMohKlYumwB3bp3Y/36LzBFFBADwgDh5bLzrAkFtGjDBFXkK4VUXizpAaHIPX+SpUsW8803OSz536XkXvSAcoESgFVi16y5MbRowwUFSimfZJUEZSGlF/CyfftOjh49xfDhw9i6fRM/HziAAJQSSCXRlja00KINQxSAEBimBOXm8/XfUDnpbp57/nmiYyAnZ73vg/e9EL2wDS20aMOEQPdYoJDSiyHg3NkzbNywladad6Rm9Vo0b/Ew6z/7hLO5+ShMv4usLW0ooUUbLgjl0x8KqRRIEFKw6dtNnLtwhnsfaEBe3iWaPtSU3d/vYPePPyAMgVdFoIdBaKHztGGFBEAI4Y8MC9Z/+jk//vg9r77+77gQFBTkceDnn1m//hOa/qEJEgOFdpBDCaGU0r5RiKMAiUSh/GtVCVJy+uQJknu/yJOt23Dfg41RlhfTMFi+fBk/HzrKhOxsypUrR6RO14YU2tKGAT7BKUd4AgMlFCtXrebsuVx6JSdz113VnNdXqpRE3/6pfPLJp3Tp/GwJXLHmZtCLmTChSAxYCC4VFHL0+Cn+rUNHyldIxEKhlBdwU7duHZo/0oxTJ09iSaWtbIih3eOwQKF8ssSehwsLPeReuEhUVBSxcbEIA0zl2yigFJw5dwG3MihfvjzRhp67Qwkt2rCgqGiVEkgJCIFSIITCMCSGkggUXssCIwKPEigliHGZ2tqGEHpNGxYIUMIXNcb3f4lCKACFEP69P8IApXC5TCwJLmEgDC3XUENb2jAm8IMVV/mOKvKcJlTQljaM+aUYxW88rwkFdARCowkxtKUtBUgpkVL617xgGIbztSb00KItBQjhC07p8EV4oN3jUoBlWeTl5ZX0ZWhuEVq0pYD9+/fzzjvvcPToUVwu7VyFOlq0YYhSCiklHo8HKSXLli1jxIgRzJs3D8vS7WVCHS3aMMWyLFwuF3v27CE7O5vY2FgmTJjArl27dBAqxNGiDUPsgJNSiokTJyKlZMSIESilmDp1Km63u4SvUHMzaNGGCUop52EYBhEREeTk5DBnzhy6detGcnIyPXv25MMPP2Tjxo2ALxWkI8qhhxZtmGGLMC8vj7Fjx3LHHXfQv39/DMOgX79+JCYmMnr0aPLy8pBS4vV6S/iKNb8XLdoww/Bvs/v6669ZtWoVqampVK1aFSkld955J/369WPNmjWsXr0al8ul17chiN4wECZIebk/VF5eHs8++ywxMTFMnjyZxMRE3G43pmly9uxZevfujRCC6dOnU758eaf4QhMaaEsbRijl24a3ePFitm/fzoABA0hMTMTr9eJyubAsi8TERDIyMti2bRsLFixwxGqXOuo5PPjRljZMsIV54MABOnXqRM2aNZkxYwZRUVEopTBN03mtx+OhT58+7N69m3nz5lGjRg28Xq9jcQ3dySKo0Z9OGGDPu1JKPvzwQ44cOcLrr79OTEzMVV3fiIgI0tPTOXfuHNOmTXMsNKDd5BBAizYMEEJgmiY7d+7kvffe44UXXuCBBx5ASnnVCiilFM2aNaNTp07MmjWL77//3tftwu8ia4IbLdoQxbIs52GvRceNG0dsbCxpaWlER0c7Yr7S3ZVSEhERQf/+/TFNk8zMTAoLC7WVDRG0aEOYwGKKzz//nPnz59O/f3/q1KkDcM2osFIKy7KoW7cuycnJLF26lI0bN+JyufR6NgTQn1CIYovLTvFkZmZSpUoVBg4c+JsRYFvMQgi6d+9OjRo1eP/997lw4YJ2j0MALdoQxu5GsWLFClavXk1GRgYVKlT4VTc3UNBKKWrUqEFGRgY5OTmsXr0a0zQdd1snFoITnfIJUSzLQilFbm4uXbt2JT4+nilTppCQkICU8nftmz158iR9+vTB6/Uyffp0KlasiGVZTvpHr3WDC21pQxTbvZ09eza7du0iLS2NcuXK4fF4fve6tGLFirz66qv88MMPLFy4ENB9pIIZLdoQxTAM9u/fz/jx42nTpg1PPPEEXq8XwzB+l2trb5hv0aIFbdq0YfTo0ezZs8f5OZrgQ4s2RLDFZT8sy2LmzJmcOXOGjIwMJ8VjGMbvspJ2w7eoqCjS09O5ePEi06dPv83vRnMzaNGGCHbxg10ssWnTJiZOnEhycjKNGjVycrKmad6QW2tZFg8++CDPP/88U6ZMYceOHdpFDlK0aEMEOxVjGAZut5vs7GzKli1L7969iYiIuOGfG+hKu1wuBg0aREJCAu+9957eaxukaNGGCLbVM02Tzz77jKVLl9K/f3/q1avnRJJvhMCeyFJKatSowaBBg1i8eDGffvppkdfqNW5woFM+IYL9MZ0/f54BAwZw7NgxFi1aRIUKFZyC/xt1ZQM3DCilOHPmDM8++yzlypVj9uzZREdHI6V03G9NyaItbQhhF1Lk5OQwePBg7rjjjltSwXSl2O+44w6GDx9OTk4Oq1atcjpc6FMKggNtaUOI48eP07VrV6pUqeK0RbWLIG7VPli7Gio/P5++ffuyb98+li5dSuXKlfF6vURGRurgVAmjLW0QE9hhUUrJzJkzOXjwIKmpqZQpU6aI1buVhf6WZREXF8fLL7/MoUOHnA4XejNBcKA/hSDGFqwQgh9++IEpU6bQsWNHnnzySaSUGIZxy3fm2MEuy7Jo3rw5Xbt2Zdy4cezYseOmotSaW4cWbRBju71er5cpU6aQl5fn7IENtLK30l0NDGq5XC5efvllCgoKmDZtmj5SJEjQog1ibAFt3bqVhQsX0qdPHxo1auRY2dtBYNsZpRR16tShd+/ezJ49m02bNun1bBCgRRvk5ObmMnLkSBITE51CituddglM/5imSWpqKpUrVyYzM5P8/Hynybm2vCWDFm0QY3ekWLduHSkpKdSsWRO4dkeKW0FgJNreNHDXXXfRp08f1qxZw8cff6wDUiWMTvkEMSdOnCAlJYWCggJmzZpFYmJisV+DvUHh3LlzPPfcc0RFRTFr1iwSEhKAWxu11lwf+o4HMUuWLGHjxo0MGzasRAQLlyPYdpPzLVu2MHfu3BK5Fo0PbWmDCDsfaxgGx44d49lnn6VWrVqMGzeOhISEEjm+I7DEMS8vjyFDhrBt2zYWLVpE1apVixyrqY8XKR60pQ0iAnszTZ48mVOnTjF06FDKli0LlEwj8cDfWaZMGQYOHMjp06edFFBg0ErP/8WDFm2QYZomO3bsYMaMGTzzzDM0btzY6W1c0iilaNKkCV26dGHmzJn8+OOPznPayhYfWrQlzJXupWVZjBs3DsuySE9PJzo62nmupC2ZEILIyEgGDBiAEIKsrCznVHkt2uJDi7YEsdewtiUVQrBp0yYWLlxI//79qV+/vnOq+412pLjV12tZFrVr1+bFF19k7ty55OTk6CNFihkt2hImsHF4YWEhb7/9NnfffTfPP/98SV/aL7AnDZfLRffu3alatSpZWVmcPXtWW9piRIu2hAk82mP16tV88cUXpKWlUb169aCzXPb12B0uMjIy+OSTT1i2bJkWbDGiUz4ljGVZGIbByZMn6dGjB9HR0cyaNYv4+Hgg+IoXAodLXl4ePXv25Pz588yfP5/ExMQiE02wXXu4oO9qCWILQAjBsmXL2LRpE8OHD6ds2bLOGjfYCHTn4+LiSE1NZd++fcyZMwe4vE7XKaDbhxZtCWIP/gMHDvDWW2/RpUsXWrRoETKF+Eop2rRpQ8eOHZk0aRL79u1zGtDpNe7tQ4u2BLHXslOnTiUvL4/BgwcTGxsbdGvZXyMqKor+/ftz7tw5srOznYqum+kQqfl1tGiLmcDDoIUQfPvtt0ycOJHOnTvTpEkTZ/N5qHQ9lFLy8MMP06tXL6ZNm8b27duL7MnV3Hq0aIuZwK79brebSZMmERsby5tvvum8JlTcS9sjEELQs2dPypcvz6hRoygsLAyZSScU0aItRgKLKUzT5IsvvmDOnDmkpKSQlJQUch397QnI4/FQr149UlJSWLp0KTk5OTpyfBvRKZ9ixnaLL126RO/evcnNzXX2ytpr3FDBnoQAZ2dSjx49SEhIIDs7u8S2E4Y7oTNCwgjDMFi8eDFfffUVAwcOpGLFini93pAL3NgdLuwSy8qVKzN06FC++eYb1q5dC1CkTFNza9CWthixc5fHjx+ne/fuJCUlMX36dCIiIn73EZXBiFKKvLw8+vbty+HDh5k3bx6VKlUCCIra6XBBW9pixA4uLViwgAMHDvDSSy8RGxvrPB8O1iguLo4hQ4Zw8OBBZs+ejcvlAsLjvQULpVu0yle5I5VCIpHSi5KFKFUAFOIGPJZEFXqRlqQAcCs3UIBS+UjLwpJeJBYSC6UskEUdl8BDoAH27NnDyJEj6dSpEy1atAB8Vsi2tKGMZVl4PB6aN29Ohw4dyMrKYt++fZimWUS0CnBLsCwvSl3CAjwKpMeD5S3EY3lAuvFKxSVLIRVI5T9QWylKu/xDe5TcLAErA1/pnYWSbtavXcl//OWvrFjzOYXSQPgDLgUKLOXhpz07ePPN/2Dy5FlcKihEIVBIUJZvRKorf41ygk/Z2dkIIejfvz+RkZEARaqIQpXAksyoqCiGDx+Ox+Phgw8+wOPx/CIFZClQymLvni3837feZvGyFVgeC5BIJdn3ww6ysrI4fuYMKLBQIC30Yq60izYQAT7NKD775HM+GDmG0R+M5ujx06hIkEIRiSJKwaxpH/KP//99pk+bR6FbIpzbeO0RZRgGW7ZsYd68efTq1Yt77703ZMoVrwf7OBG7GqpBgwb07t2bOXPmsHnz5iJehAAECpdLsG/3j4z853v8/a232blrL4YrEsMVwU/79jFj2nTOXcglxB2QW46+HTYKpFIoQFrwxONtuJSby7r1n3HJUFgmRAovx3/ey7YNO+j0p06YRiQoE4VvIF7zRytFbm4uWVlZxMfHk5KS4ljZcCNww0D//v2pXLnyL0+VV2AaCrDA8tCg4X1gmkyeMo1Lbg/KPyzNCBemVuwv0HfEjxACYRiYGCgF1WvUofGD97NuzcfkWRKvAtPysHrFCuITEvlDs2Z4LQtDBAhW8Av12l36161bx+rVq0lNTeWuu+4q0uUwnLDLMJVSVK9enaFDh/Lxxx/zySefoJTynUwgLQQCUCgsKidV5IUXerD+s0/55ttvfbfR8C8XruK8lHYPWYvWjxC+YYQAC4kRHUW7tq05uPd7vv9hDxFGBBfOnmL5ynW0bN2K6NhIDFOhhD2ExFXXs0IIzp49S1ZWFnXr1qVr165FihLCCTtva6/PLcuic+fO3Hvvvbz11lucOXPG5yYLgfL7J0oIvNKiXbs23HdvfWZMm4zXcmMI39C0AhexYTjJ3QhatNfAqyweafow1SqVZfnCZbiUZPOGrzjnhhZtHscw3CjlBrxcVa1+hBAsXLiQzZs3k56eTlJSUpFmbuGMlJJy5crx+uuvs2PHDpYtW4ZhGL5ougIwkcLAkpKE+DgGpfZjy8aNrFmzEtMvfkML9ReUYtHaVlKB8llJpXzfU0LhUYq4hLI88dgf+PzjtRw6eJB5C5fyUPM/UqtGdSyvB2H4dusoBFIJEAaIywdBAxw5coSsrCxatGhBu3btSlVnBzvV8/jjj9OqVSvef/99Dh8+jGmYICUgkEQgFbg9Hhr/oSktmjdl2qRJnM/NxTBMQCIBJXxWWYhfjx+UBsJ71PwqCvyurQCQoKTCKz1IUyKVi0JD8ehTjyI8p5k4dhobth7jyVatcSFQngiU8mAp0zeoMEEppPLgdhc6ZYlTp07l+PHjDBo0yCmkCMzJBp72Hk4PuFxMEhMTw+uvv86JEyeYPn06QkCk8AAWlozDFAamEERGx9LnxRc5eeQwa9Z/iRkZgdtdQCFgYaAMEwOBEd4Oym9SikV7NQRCmGAYGMInqLvvqcsfWz7CBx+Momq1GjRt/CAKL6ZwIQREuAwuS99nAwzT59rt3LmT6dOn061bNx599FFnQ0Dg1rvS8ABo2LAh3bt3Jysri23btvhy2gD++2gYAo/08OCDjXnm6aeZMnUa+RfziHZFXRHfu/ZSpLTgKukLCBZ8xkGglMAULuJiIzENg2gzlieefJJFi9bx3HOdKRMbjcIiMjqKmOgY34DDN4wkYBoChInb7WH8+PFIKencuTMej4fCwsISfY8liWEYJCcns2zZMqZMmcbbf/8vIl0uIlwRxERF40+RIxF06/4cC5esQBhgGpcFazjeUel2kEvxhgHlKzvEwBf5FUjlQUoPefl5WCqGuDLRmIYbaVnk53mJjS2LMsElLPJzL1DglsTGJxAVEwVKYSBR0sI0I8nJ+ZIuXTpz4sQJKlSowKVLlwBKdRuWyMhILl68SLVq1ZgyeSJPtnqSixcLyCt0U65sWUwDTCyUlOTm5WFJgzLxCWCaCMCFxBASMCnNwi3FltbvCvu/VoAhTAxDUK5sFBITJRWGiMBluoiMLINSAonAUIL4shWIFwKlAk+WMzFMg9zcXDIz/0V0dDRlypShbt26tG3btgTfa8mjlMLlcrFmzRrWr1/PhKyJNGvWnKioKGJiYn15WRS+eyj8h46ZWErYySFA+u916ba2pVi0UPSDtweCiVK+QWILUSkLhBcwMJTLceV8FtNudSp87jGCtWvXsm7dOv72t7+Rk5PDd999R69evahTp05xv8Gg4ty5c6xbt45q1arx6aefs3rNWp555mmUVAgJGPZ9VL67qUDgQij8Qr0cPCzN6ECUsxpVl/+quPw9ZaAwfBsCkP7Fr79xGcqpowXfzTxx+jTvjRxJ06ZN6datG4MHD+bcuXOMGTMGKHqcZWl6SCkZOXIke/bsYdy4sbRs+Ufee28kJ04cxzD8Gy78d9VXfOH/m5L++6ucj6e0o0Xrl91VI5/4inB8X7sQwkTYdYvCzssaPrfZshDAogUL2LtnD2lpaSQkJNCwYUO6devGokWL+Oqrr5yCenvLXklHdm/nI7Dr5K5du5g2bRqdOnWiffsO9O3bhz17drNkyRL7JqOURCkJSiAwESIw0m747n8pX8+CFq2fgKSC86XhH0wgMBC4APPy8/6HwrfRwDAMdu7axYTx42nXrh2tW7dGSonL5SIlJYWEhARGjx5Nbm4uQoiAdXB4Emhh3W4377//PgCDBg0CoFWrJ+nQoT3jx0/gp59+wjB8yxIpbbfYJPAz8P1haNGiRXvT2JZASsn0adM4e/YsqampREVFOYO2bt269OrVi5UrV/Lpp5+WitYr9n1xuVx8/fXXLFy4kIyMDOrVq4fX6yU6OpoBAwZw4cIFZsyY4RSj2BOa5tpo0d4CDMNg165dTJ06la5du9K4cWOUUs5+WcMweOGFF6hbty7jxo3j4sWLYV/CaAswPz+ff/7zn1StWpXnnnuuSPuZRo0a0b17d6ZPn86WLVuc3UG6Z/KvE94j5zZht4+xrYPb7ebdd9/ljjvuICUlhYiICAAiIiIcK1y1alXS0tLYuHEjixYtCnuLIoRvU/yyZcv4/PPPefXVV6lataqT+hHCd6p83759iYuLIysri4sXLwK6n9RvoUV7AwSKTQjBl19+yUcffURycjJ169Z1vm+7wHbE+KmnnuKhhx5izJgxHDp0KOwtyokTJxg9ejSNGzemQ4cOwOWjQmxPpFatWiQnJ7NixQpycnIcS6y5Nlq0N4AtSMMwuHDhAiNGjKBOnTr07NnzmtZTKUWlSpXIyMhg9+7dLFy4MKwtLcDMmTPZvn07r732mnPebiB2LfYLL7xAzZo1GTt2LBcuXCiBKw0ttGhvEPt0uDVr1pCTk8Of//xnkpKSfuHa2c28wTdIH3vsMdq2bcvYsWPZvXu387PCwSUMXMcfPHiQrKwsZ7PE1d6fvXSoWLEiAwYM4Ntvv2XJkiXOnlv7Ee6T2+9Fi/YGEUJw6tQp3nrrLR577DEef/zxa0Y/basMUKZMGYYMGUJubi7Tpk1zIszhUJNsp3k8Hg+jRo3i0qVLDBky5Kr9sOzJzI6kd+jQgZYtWzJx4kSOHTvmCDqcmt/dKrRobxDDMJg5cyZHjx5l2LBhlC1b1hlg10rn2IJu0qQJXbp0ITs7m02bNjn7a0NdtAAul4sNGzYwd+5cevfuTcOGDZ0Ci1+jXLlyDBw4kD179jBlyhTHkwn3df+NoEV7AxiGwc6dO5kwYQJt27alRYsWuN3u64oISykxTZO0tDTKlClDdna2M6hDXbRCCAoKChg3bhzR0dEkJydf17+zrXPLli3p2LEj06ZN8xdchMdEdqvRor0O7LWax+NBSonH42Hq1KmcP3+eN954g4iICOcg6OuxDEop6tevT58+fZg5cybr1q0LyXN8Ak9PsEsyP/vsM5YtW8af//xn7rnnnuuq/LKXD1FRUQwcOBApJWPHjsXj8RTphKHxoUV7ndhJf6UUmzdvJjs7m+TkZKpXrw78/n5PUkpefPFFatSowejRo6/LhQw27PW4HWQ6c+YM//jHP2jYsCHPPPMMULRD46/9HACv18t9991Hr169mD9/Pps2bSqSOtP40KK9Tmz31e12k5mZSZUqVRgwYIBTxXM92K+zI6LVqlUjNTWVtWvXsnTp0pAbnPZEZQtz+fLlbN++nWHDhlG5cuXr/jmB7zsiIoLevXsTHx/PmDFjnGWHJgCl+U2klMrj8SillPrf//1flZSUpMaPH6+UUsrj8SjLsq77Z1mWpTwej3K73UpKqU6fPq3+7d/+TTVq1EidPn3a+X2/52eWFF6v17kve/fuVU2aNFGdOnVS+fn5v+v67fdrWZbyer1KSqmmTJmikpKS1PLly4u8Tkp5y99HqKEt7XViGIbTdLxBgwZ0797dOeri91gCOyJqlzpWqFCB9PR09u7dy7x58wBCJtVhB4qUUsydO5fjx4/z5z//mZiYmN+1FrUtdeAZve3ataNhw4b885//JDc3t8ja+Xp/briiRXsd2INqxYoVfPPNN7z88suUK1fupn6ejZSStm3b0qZNGzIzM52oaShEk5W/jnj79u1MnDiRTp060aRJE2d9fiNurZ2fTUpKYujQoWzdupV58+YVaTlb2tGivU4OHjzIiBEjaN++PU899RTATQdJlD8qHRMTw6uvvsrJkyeZM2eOE3EN9rWcYRgUFBSQlZVFREQEaWlpREdH35Lr9ng8PPXUUzzxxBOMGzeOI0eOOKfylXb0HbgGSl0+/U1KyezZszl69CgpKSnExcU5M/7NpGoCOzzYBRejR4/m+++/dyLVwUagmwrwxRdfsGjRInr27Ml9993nXPPNCNe2tjExMQwfPpyDBw8ydepUQFta0KK9JvaaTAjB5s2bmTx5Ml27duXhhx92cpI3u5nd3iRumiaRkZEMHjwY0zSZMGFC0PZIDpzMzp8/z+jRo6lcuTIvvvgiQJF16c38Dnt5YPfamjBhAjt27CgVDQR+Cy3aa2APnIKCAmbMmAFARkaGs0f2dlC/fn169OjBggUL+Oyzz4JucNrWVfl356xcuZJvvvmGlJQU5/jOW0FgWadpmqSmphIREUFWVlbRc25LKVq0v4JhGHz99dfMnj2b5ORk6tSp41Tp3K7f99JLL1GuXDkmTpzoNDgPFmy3NTIykqNHjzJq1CiaNWtGt27dnOduBbYnY1v1hg0bMmDAAObOncumTZtuye8IZbRof4ULFy4wceJEatasyQsvvOCka25XMEQpRVJSEgMGDGD16tWsWrUKKaXTIaOksdfgXq+X+fPns3//flJSUqhQocItbVRn/x77Xiul6NWrF3feeSdvv/02ubm5KOU7oDoctjT+XrRor4FpmqxevZr169eTkpJCtWrVbnvjMfvnd+vWjUaNGjF27FhOnz7tBKuCAZfLxf79+5k8eTJt27blsccew+PxADcXfAokMG9rv/ekpCT+/d//nfXr1/Ppp586n0MwTGbFjRbtNTh+/Djjxo1zmo/B5R06t2utKYTA4/FQpUoVUlNT2bRpEwsXLgyq9I/b7WbChAnk5uaSkZFBXFyc43ncLqtnmiaWZdGxY0ceeeQR/ud//odjx46V2m17WrR+7FnbnrkXLVrEDz/8QEpKCvHx8U7w5XZjW5b27dvTtGlTJk2axJEjR4psUytuCxP4+7Zs2cLs2bPp2rUrDzzwQLEdkm0YBmXLlmX48OF8//33ToeL0kjpfNdXwS50UEpx4MABJkyYQLt27WjVqpWzIft2Wzu7Q6FpmpQrV45hw4Zx4MABZs6c6Vyb3bW/OEVrp3jy8vKYOHEicXFxJCcnO5H0wA4UtwP7dwD88Y9/pEOHDmRmZrJ3795SaW21aP0EBlkmTJjA+fPnnUKKkgp2tGzZkk6dOpGVlcXOnTtLZB1nC9YwDFatWsXSpUsZMmQIderUcaK8xUlUVBSvvfYaubm5TJ8+3VlPlya0aP3Y69WdO3cyZ84cunTpUqSOtiSIjY2lX79+5OfnM2XKFAoKCoBbF/C5HrxeL6Zpkp+fz/jx4/slf/IAABH9SURBVLnnnnvo2rVribqm9913H126dGHq1Kls3bq1xK6jpCjVog1cIwohuHjxIu+//z4RERH069fP6cFbUgNUSkmTJk1ITk7mww8/ZMOGDcXeF9h2e2fPns3mzZtJT08nKSmpxKLZ9meWnp5ObGws48aNc1I/4dAc73ootaINXMPa7t/XX3/NkiVLSE9Pp379+rekVPFmMQyD1NRUypQpw6RJk8jPzy/WdZxhGBw5coQxY8bw2GOPOR0pSrI9jlKKWrVq0bdvX5YvX84nn3ziBPC0aMMYOxdof8i5ubmMGjWKOnXq0Llz5xK+Oh92AUHNmjVJTk5m8eLFrFu3rljFIoRg0qRJHDhwgMGDB1OmTJliC8xdC/sz69mzJ3Xr1mXUqFGcO3eu1JxOUGpFa2Nb2eXLl/PVV18xbNgwqlSpUtKXBRRtT9O7d2/q16/P2LFjOX/+fLEJZt++fUyaNIlevXrRvHnzIkG5kgjQBfZDvvPOOxk4cCDffvsty5cvD6p89u2k1IrWdo9t9y8zM5OWLVvSrl27oKk+CuzmUKVKFdLS0pxjIwNrc2/l9QZ2h/B6vYwcOdIpI4yIiChiYUtqrR+4oaBDhw40a9aM0aNHc+LECUfU9ucbjpRa0QaWI86YMYM9e/aQkZFBfHx80MzWgaIF6NSpEw8//DATJ07kyJEjt+V3Bq4Nv/vuO2bPns3gwYNp0qSJI4aStmiBJY4JCQkMHTqUw4cPM3PmzCLHiYQrpVa09uA7fPgwU6ZMoWPHjrRo0SKo+xDFx8eTkpLCjz/+yMyZM4tMPLdykLpcLvLz8xk5ciSVKlWiR48eznPBMqEF8sgjj/DMM8+QnZ3Nnj17cLlcWrThiD3gR40ahcfjcVql2C5zMA5OgDZt2vD0008zefJkfvrpJ6fDxa28XiEEa9euZc2aNbz22mtUqVIFj8cTlPdEKUWZMmVISUlx8tmFhYVhXeIYvu/sKthrQHsW3rRpk7NXtkmTJgDOui0YkVI61jY/P5+xY8fidrtvukoqsK2OEIITJ07wzjvv8OCDD9KlSxdM03QOgg5GvF4v999/P/369WPOnDls2LAhaNv13AqCc3TeBgI3BAghcLvdjBs3jnLlytGzZ0/gciljMA5O+5q8Xi8PPfQQnTp1Yu7cuWzfvt1px3oz2BOZEIIFCxawbds2hg0bRpkyZZzvB+N9gctte3r06EGFChXIysoiPz9fizbUsQecbU1ycnJYsmQJL7/8MrVq1Srhq/ttAied6Oho+vXrh2majB8/nkuXLt2wdxBopQ3D4NChQ2RmZvLMM884XSdDASkltWrVol+/fqxZs4Y1a9bcksksGCk1orURQnDmzBn+8z//kwcffJAOHTqETHPwwHNuGzRowMCBA5k/fz5ffvklwA0F0OzJzN7Lm5mZyYULF3j11VeJjIwMCWsV+B66d+/O/fffz8SJEzlz5gxQ/FsZbzelRrR23tHlcrFy5Uq2bt1KRkaGc3p7sLp+NrZg7W1wLpeL7t27U7NmTTIzM50WLDcyAdlLhq1btzJ9+nSef/55GjVqFBIR2Cu7XCQmJpKSksJ3333HvHnznPtxO3t7FTelRrR2HfFPP/3EyJEjad26NW3atAkJwV4NKSU1atRg8ODBfPnllyxbtuyGapLtgex2uxk9ejQJCQmkpqaG7ACXUtKuXTtat27NhAkTOHz4sDPZhep7upJSI1rwrdnmzJnDvn37+Mtf/kJsbKxjnUIRpRSdOnWiQYMGTJ48mZMnTzrfv17syezLL7/ko48+Ij093ek6GYqTmVKKuLg4+vbty+nTp5k2bVpJX9ItJ6xFa5ey2aLcs2cP48ePp0ePHjz00EMAIXvUhC3M8uXLk5GRQU5ODrNnz74ui3Jla50zZ87wzjvvULt2bbp27Qr4CiyCOV99LewyxpYtW9KtWzemTJnCzp07w6rDReiN1t9BYLWQ2+1m7NixREdHM2TIEGfL3e1ui3q7kVLSpk0b2rdvz7hx4zhx4sR17XYJDFqtWLGCzZs3M2zYMO68807nvoSaYOFyGWZERAR9+/YFYMKECTcVYQ82wuNd/Aa2+zd//nx69epFvXr1QtYltrEtil1wMXDgQI4fP8577733m2Kz1/GBKZ6mTZvStm3bkF/32dsGpZTUr1+ftLQ05s2bF1YdLsJatPbAvHTpEpmZmSQlJTFo0KCgrS3+vQTmnlu1asULL7zAjBkz2LJlC3DtVIe9Q0ZKyaxZs/j555957bXXiI+PD/nJLNBDEELw/PPPU716dUaMGBF0JzbcKGEt2sBCirVr1zJgwAASExNv6REWJYU9IQWuPfv3709+fj4TJ050DvC62gRlW6Mff/yRqVOn8vTTT9O4cWPn+6FMYAoIcHpIf/zxx3z88ceA7xjNwFhHyKHCnFOnTqnHH39c/elPf1InT55UXq9XeTwe5fV6S/rSbimWZSkppfrHP/6hypUrp77++mullFJer1dJKX/xWrfbrV555RVVp04dtW3bNiWlVIWFhcqyrJK4/NuClFJ5vV519uxZ1b59e9W6dWt16tQp5fF4lNvt/sV9CRVCe1r9DZRSLFy4kJ07d5Kenk5iYmLYVccEYlcE1ahRg7///e/X7N5oGAZfffUVCxYs4MUXX+S+++5zUjzhdG/s95OQkMBf//pXNm3axMyZM0M+khx2og0U5YEDBxgzZgxPPvkkTzzxBF6v13ElQzEyei3s92xZFjVr1mTgwIF89tlnrF69GtM0f+Ei25H0smXL0qdPnyLlkaHuHl+JLdxmzZrRvn17srKyOHr0aEjvuQ2rT0gFbL3zer1MmzaN8+fP88orrxAdHe2kdux1YLhwZSlf7969qVu3LmPGjOHo0aOAr42MffreRx99xOeff05aWhpVq1YFfHnZ23n2bklh35PIyEheeuklzp49y+jRo4tMVKFGaF71r2BX+Gzbts05vf3ee++95RvFgxXbHfzLX/7Cl19+ydKlS533bZomJ0+e5F//+hcNGzakc+fOYRNJ/zXswGPTpk1JTk5mxowZzokNoUhYidb+EAoLC8nOziYuLo7+/fsTHR1dKgZnIG3atOHRRx916m/tddyCBQv4/vvvSUtLo2LFimE9mdmel41hGAwcOJCoqCjefffdkD1SJChEawvKvsmBbm7g339LdHbKYu3atSxbtoz+/ftTr149lFIl3nT8dnPlBv4yZcqQnp7OoUOHmD59OkII9u/fz/jx42nTpg2tWrUKmsOqbxeBlV12wUX16tUZOnQoixcvJicnB+C6G8FdbRyWRGBTqCD41K7MmV0ZKArMq/5Wid65c+dITU3l5MmTLFiwgDvuuCOsB+bVsN+vZVmkp6fz1VdfMWfOHBYuXMjkyZPJzs7m0Ucfxev1AoR8NPV6sSwL0zQ5duwYzz33HOXKlWPWrFnExsY6z11rnRso7MD1sH2vi3V9fJtTSteFZVnK4/FcM39qWZbyer3K6/X+Zh5xxowZqlatWmrevHm363JDiu3bt6vatWurtm3bqvr166v//u//LulLCgpWrlypKlWqpGbPnq2klDeUt5VSOo/iJCjOUVBSIgClJEeOHOXrb7/D7XYjkFSrVp2HHmpMdEw0OBZTAsL/uMzx48cZP348MTExnD59mg8//LCY30nJoVAIBCjfV+A7OcGyLKpVq8aqVasoX6ECQgjmzZvnpL9KEyrg3KYLFy4QGxvLBx98QLNmzahevbr/RQQMK9v7Mzh37iwbNnzHqVOnqFmzJo0aNSI6Ohoo/rayQeEeYyksFKbhYfH8mbzyxmgefrghsabF7v0/06BBI/7v398iPj6WSOHFEF7AxEsESiqE/y1MmjSJN998E6/XS1RUVMjm4W4I/7gRCoQSCMNEYoEAKRUFlwoxTZOoqEiU8k2SCN8IDYIRUOyYpsmlS5eIiIjgb3/7G/369cNQAoXAMkAoL8h8TAHffLeZt94ewfnTuVS+s7Ij3HdHvOtvbg+GUXzCDQpLCwLlG224L12g8l3V+ce773JX+TJ8tOZjXnnl/+PrDRtp+9RjKCUBCxAgBEoqwNdK5vHHH2fhwoVO0KG0oACJBCUw/aJF+O6p774amIbps8IqMJBy2ZKUVqSUJCYm4nF7iHK5QJgoAGHhMhT79uzmzTf/kypVa/O3/3qLatWrcejgIVatXkNhoZv4eOWf9EqdaC8jDAPT5SIqMgoREUWd2ndTtmwcHnchClD+AQkClP9L5QtQ1a5du9QEVa7ElmH4xsdvD0oppFJYXi8KC+UPghoowGTlRx9z/MR5Mse8wd01q1FY6OG++++jfoN6gG/vrstVvGMuCEUrOH/+PB+vXkNirMmcRfOpXOkOHv7Dw3iUwhQmtqX1DVDl/3dG2NXOXi8KsBQIpTBRCOGfzYTJ2fO57Nm9i0t5F6hYsSJ331ObyCjfSQoKgSEExejZBRXKn8LxNUIwEEKihEQgMJTCk3+J7zZspdEDD3Nnlap4vV5MU+D12q14FIZR/GMueETrHzgmgqOHDjMpO5t4l8XBY4epUvkujhw+SEKFsngRmMJEKMPn1Jkuwjj9et0Y+HWKRCkLaSlWr15JVvY0Tp04RoShKLh0iYcfacGgtDRq3V0bn2wV0RGl0zspWsro34PrXyoooPBSAadOnuau2tUwTIHLdGEbiZI8jCzoFjOWJbm7dm1GvDeCrKws5syaQWSU4N1338XtlShhYF+2UNodDMRxkQ2T7du3Mnz4cGrVupuxY8cyZWo2b/39LTZu3MB//dd/c/7CBQxh+Na+JXrVwYJASROpfA0CBIII0yQmNoZL7kKEAb47fPnh06ryx1mKj6ATrULhinSRWDGR8kkVqXVPXVo0b8ZP+/fhdjoECgjvXYU3hZQe3v2fd2nSpCn/5z/+Sr26dbgzKYnHnnySv/71r2zc+B3ffPstLpdAmPo+2iglUBJffM7rJSo2hnr16vL9jh2cO5cL/lQagGG4UP7/ipug+MSkUv4crIlXRWOqQlwCwKCwIJ/de/aTVKECsYZvrQEGSgiUoERuWvChkEIilReE5Pyp0+z+cRctW7YkoWwcHqnwKoHyFNDw/gZUuKMCO3btxINvfOo76EMIhSH8FtQwITKa1m1bc/H8cf71/nucPXsWy1KcO3eeyZMnc/zYSQSGLzhajATFmlYJBVKBEYGKSGDXju/4j9deISYmhpMnTnDq9GneeOMNEqIiUFKCYWi/+AoUXpQ/f11YUIiQigrlKwAgDROXiESoAuJjIykTH8fp3Dy8gKnvo4Mw7Jy/QgkXKEnzli144/8MZ8R7maxasYo6tWtz5OgRKpSvQIf2T6OUWezucVCI1k7bWJbFAw88wKC0NOfUs6fatKFDhw5UqlQJKWWpTen8FsL5UyAMA4mgsNDtzzn6q6WEgcfjweMuJMLlwsDn4OhAnh+nGsqXmbCkQhgGz/fowSPNH2PpspUcOXKEbt278tRTrYmJsSuiitdhDQrRKv/IkVJSr1493njjjSLP25va7aKJ0lZ+99sIBCZ2SCk+IYHomCj27t2LL0Em/KltF4cPH+b0qdPUr1fPN0YtC1HMecbgxcAOMinlW3gZwsSSiuo1a5CRke680t4hpZRv04VhFJ+UgmL022Fze/tc4LY8u6NiRERESDcVv90YvuwiKIiNT6BVm9YsWbqEzz7PwbIkCIPjhw6QNX4CNWvWpMUf/uDL62ozexlh/+Efj4YLYRgYV1STKSX9eV38B6KVQkv7W3mucN4HeyvwZR4MBAolfANrUHo6u/f+xMCBqTRr3pL4uGh2bd3EN199S9s/dSY6MgphCZTlBR1BBgIDcgIw/MuKyxFiceWrhEFJhPGCYsPAb12CFu11IEEJC18Vsq9i7Py5C3y+Podvv9uI13LzYIPaJMTF8a/xUzh9voCXhg6hy7MdiY6JKumrDwp+OQoVV0r52hTfxKdFGy5IUMKXwJFYSEviMl0IEehMeUBaHDx0gvc/GEtSxYq8NDSD6JjIkrrqoOKX6S87MiUx/NVjV+dywU9xEBSi1dxq1BW9n3zDTdipCWFgSYm7sJDo6Gg9KQZwNTGIX3226CuKAy1ajSbE0BEIjSbE0KLVaEIMLVqNJsTQotVoQgwtWo0mxPh/XAnVgzxat34AAAAASUVORK5CYII=)
In △ ABC, AB = 24, BC = 36, AC = 38
Find MN, NQ, and MQ.
![](data:image/png;base64,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)
Which of the following is the graph of the equation
in the x y -plane?
Note:
We can also use slope-intercept method to draw the graph if the given equation. Where we will first compare the given equation with standard equation . When we get the intercepts and slope, we can easily draw the graph.
Which of the following is the graph of the equation
in the x y -plane?
Note:
We can also use slope-intercept method to draw the graph if the given equation. Where we will first compare the given equation with standard equation . When we get the intercepts and slope, we can easily draw the graph.