-Suppose that a household appliance draws a current represented by the relation I(t) =5cos(120πt) , where t is time measured in seconds. The power consumed by the appliance is P=I2R , where R is a constant. Take R to be 12 and graph the power in [0, 0.04, 0.01] by [−200,2000,200] and use an identity to write the expression for the power in the form P=acos(kπt) +d , where a,k , and d are constants.
A) P=150cos(120πt) +150 [0,0.04,0.01] by [−200,2000,200]
B) P=−150cos(240πt) +150 [0,0.04,0.01] by [−200,2000,200] C) P=150cos(240πt) +150 [0,0.04,0.01] by [−200,2000,200]
D) P=300cos(240πt) +300 [0,0.04,0.01] by [−200,2000,200]
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![Solve the problem. -Suppose that a household appliance draws a current represented by the relation \mathrm { I } ( \mathrm { t } ) = 5 \cos ( 120 \pi \mathrm { t } ) , where t is time measured in seconds. The power consumed by the appliance is \mathrm { P } = \mathrm { I } ^ { 2 } \mathrm { R } , where \mathrm { R } is a constant. Take R to be 12 and graph the power in [0, 0.04, 0.01] by [ - 200,2000,200 ] and use an identity to write the expression for the power in the form \mathrm { P } = \mathrm { a } \cos ( \mathrm { k } \pi \mathrm { t } ) + \mathrm { d } , where a , k , and d are constants. A) P = 150 \cos ( 120 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] B) P = - 150 \cos ( 240 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] C) \mathrm { P } = 150 \cos ( 240 \pi \mathrm { t } ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] D) \mathrm { P } = 300 \cos ( 240 \pi \mathrm { t } ) + 300 [ 0,0.04,0.01 ] by [ - 200,2000,200 ]](https://d2lvgg3v3hfg70.cloudfront.net/TB7514/11ed7ae0_8274_349f_a08b_27ada0c100a0_TB7514_11.jpg)
![Solve the problem. -Suppose that a household appliance draws a current represented by the relation \mathrm { I } ( \mathrm { t } ) = 5 \cos ( 120 \pi \mathrm { t } ) , where t is time measured in seconds. The power consumed by the appliance is \mathrm { P } = \mathrm { I } ^ { 2 } \mathrm { R } , where \mathrm { R } is a constant. Take R to be 12 and graph the power in [0, 0.04, 0.01] by [ - 200,2000,200 ] and use an identity to write the expression for the power in the form \mathrm { P } = \mathrm { a } \cos ( \mathrm { k } \pi \mathrm { t } ) + \mathrm { d } , where a , k , and d are constants. A) P = 150 \cos ( 120 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] B) P = - 150 \cos ( 240 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] C) \mathrm { P } = 150 \cos ( 240 \pi \mathrm { t } ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] D) \mathrm { P } = 300 \cos ( 240 \pi \mathrm { t } ) + 300 [ 0,0.04,0.01 ] by [ - 200,2000,200 ]](https://d2lvgg3v3hfg70.cloudfront.net/TB7514/11ed7ae0_8756_a9d0_a08b_771a6f78d66a_TB7514_11.jpg)
![Solve the problem. -Suppose that a household appliance draws a current represented by the relation \mathrm { I } ( \mathrm { t } ) = 5 \cos ( 120 \pi \mathrm { t } ) , where t is time measured in seconds. The power consumed by the appliance is \mathrm { P } = \mathrm { I } ^ { 2 } \mathrm { R } , where \mathrm { R } is a constant. Take R to be 12 and graph the power in [0, 0.04, 0.01] by [ - 200,2000,200 ] and use an identity to write the expression for the power in the form \mathrm { P } = \mathrm { a } \cos ( \mathrm { k } \pi \mathrm { t } ) + \mathrm { d } , where a , k , and d are constants. A) P = 150 \cos ( 120 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] B) P = - 150 \cos ( 240 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] C) \mathrm { P } = 150 \cos ( 240 \pi \mathrm { t } ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] D) \mathrm { P } = 300 \cos ( 240 \pi \mathrm { t } ) + 300 [ 0,0.04,0.01 ] by [ - 200,2000,200 ]](https://d2lvgg3v3hfg70.cloudfront.net/TB7514/11ed7ae0_8e94_c241_a08b_1f552d054d6a_TB7514_11.jpg)
![Solve the problem. -Suppose that a household appliance draws a current represented by the relation \mathrm { I } ( \mathrm { t } ) = 5 \cos ( 120 \pi \mathrm { t } ) , where t is time measured in seconds. The power consumed by the appliance is \mathrm { P } = \mathrm { I } ^ { 2 } \mathrm { R } , where \mathrm { R } is a constant. Take R to be 12 and graph the power in [0, 0.04, 0.01] by [ - 200,2000,200 ] and use an identity to write the expression for the power in the form \mathrm { P } = \mathrm { a } \cos ( \mathrm { k } \pi \mathrm { t } ) + \mathrm { d } , where a , k , and d are constants. A) P = 150 \cos ( 120 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] B) P = - 150 \cos ( 240 \pi t ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] C) \mathrm { P } = 150 \cos ( 240 \pi \mathrm { t } ) + 150 [ 0,0.04,0.01 ] by [ - 200,2000,200 ] D) \mathrm { P } = 300 \cos ( 240 \pi \mathrm { t } ) + 300 [ 0,0.04,0.01 ] by [ - 200,2000,200 ]](https://d2lvgg3v3hfg70.cloudfront.net/TB7514/11ed7ae0_994c_4a02_a08b_81a5298c658d_TB7514_11.jpg)
