Look at the diagram and decide if [math]y[/math] is an increase or a decrease relative to [math]x[/math]. Then determine the percent increase or decrease.[br][br][img]data:image/png;base64,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[/img]

Look at the diagram and decide if [math]y[/math] is an increase or a decrease relative to [math]x[/math]. Then determine the percent increase or decrease.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAbIAAACXCAYAAABwZd4tAAATa0lEQVR4nO3d/3NTdb7H8f0fnHHunTuzJE3SJmnLundX1y+LkH4B9o57vasLVBGkfCkg2C4C/QII6Owiit9dRXctyBeBQltQ2uIqrKh888sqlS8togOrqAW8sFwBLU3yuj/Ek1JsIeEkPefQ52PmNdUEm49v0vPqOTk5+YkAAHCwn1i9AAAAzKDIAACORpEBAByNIgMAOBpFBgBwNIoMAOBoFBkAwNEoMgCAo1FkAABHo8gAAI5GkcG2otGowuHwj26PRCLd3g6gb6LI4CjRaNTqJQCwGYoMtmOU1ef//Fz1tXX69ttvJcX2xCRp544dqlmzRu3t7ZatEYB9UGSwHaPIvvj8c/lcblW/+GL8tn988IF87gwtXLBAkUiEPTQAFBnsydj7qiyv0IAbb5IknThxQv2D2SqfMcPKpQGwGYoMtmTsaX168KA8/VzasnmzRvx+mG695bc9ngQCoG+iyGBbxl7ZtNIy5foDKgiFdPz4cUmc9AGgE0UG2+ro6JAkPf7oY8ryeLVl82ZJYm8MQBcUGWzJKKumxiYFMjM14IabNLlkoiT2xgB0RZHBdoxDiq0trfK63Fq5fLm2b9sur8utzz79VBJlBqATRQZbMQrq1KlT+tUvrtWkCSWSYuV243W/0qzKyvi/A4BEkcFmotGoTpw4oaEFhRo04GZ9//338dfKXvzri/K53PryyJH4nwUAigy289VXX6m+rk5tbW2SOve+zp49q8aNDRQZgC4oMtgaZQXgUigy2I7xhufuSqyn2wH0XRQZbO3MmTM6e/as1csAYGMUGWzJeF3sheef15Lqakm8ERpA9ygy2JJRZI8+skgPL3hIEkUGoHsUGWzJKK3KmeWqqqjschsAnI8igy0Ze2Qji4pUNGxYl9sA4HwUGWzr9OnTKh59t+6+a1T8U6IB4EIUGWzH+OTnrW9u1cIFD+mRhQu19c03FY1G2SsD8CMUGWzHKKuq8grt2rlTO3fuVMWMmZJ4nQzAj1FksBWjxA60HtDY0WMUiUQUDoc1euRdam1p6fJnAECiyGAT0Wg0fnHgc+fOqej3w7Vj2/b4/Tu2b9cdw0eovb1dElf4ANDpsorM+C25o6MjoRgbnUgkEn/9gxAj5/vmm280Yew4LX9pmaRYwRl7YC8tWaIxo0br+LFjXf4bq9dP7BdjOxOJRJLaTrG370xJFRmvTyBdvjxyRC/+5a+6Y/gIratZK6nrIUTjn2vXrlPRsOFaWr1EX375pSVrxZWPbZ2zJFxk0WjsN+f/O3VKDRs3atHDj2jenPs1b879mjtnzo/S5b7Zc1RVXqFZFZWaVVGpqooK0sfT+VyoVNm9pZpcUqLHFj0aL6fufjM2bjt69Kgef/QxTRw/QWX3lqrqh+/Fc4sYmVVRqaryClXMLI9vjy62nZo3534tevgRbXz1VZ06dSoV21b0oqT2yJZWV2tkUZEenP+AGhsa9e6uXQnl4+Zmtba0qGW/kf2ExPPlka57Vhc7vHPhfUe+OGL5+okd06LWlhZ9+I8PE95ONWxs0APz5mv0yLv00tKlyWwaYbFLFplxrHlaaZmqyit07ILXJ4BUSfQEjmg0yqEfpM3x48dVPmOmymfMkMRZsk5w0SIz/gIfmDdfD/1pQfx240XRRGP1C7/E/rlcVq+b2DvJbKeMk9gMjz6ySPPnzos/z2BfPRaZUWJvbd2qknHjJUkdHR38hQK4okWjnW8FGV88Vlu2bJHEnpmd9Vhkxm80EyeUqGX//vhtAHClM7Z1+/bu1fjisfHtIeyp2yIz/sL2fLxHpVOndrkNAPoCY5tXNrVUzbt3d7kN9tJtkRnHiV9Y/LyWLX2py20A0BcYhxJXLFuuxc8+K4ntoF11W2Txi7ZWVOj9996TxG8iAPoWY5v34YcfqnJmeZfbYC8XPWtx6j1T1PZ1W2+tBQBsp+3rNpXdW0qJ2ViPRXbmzBlNmXxP/CKtANAXtbe3656Jk/T9999bvRT0oMci++abbzRxQgmnnALo84pH360T/3vC6mWgBz0WWXt7u3bt3MXuNIA+791du3Tm9Bmrl4EeXPISVeFwmBDi4BgfUUIuP1LnpdHI5SWdR/f4YE0AgKP1WGTfffedXn3lFa1ZtVrratZq7ZoakkTW1azV6pdXacWy5czPxAxXLl+hVStfZoYmsnzZMq1ZtdrydTg1a1av1vJly1Szeo1q1pBks3ZNjdasWhV/K1evFJmx+9ewsUE+d4a8Lpe8Lrd8brd87gxyybjPy/m3ZYgZJjPDC792N1dy0Rlm/PDVdeEMrV6bU9J1Zl6Xm1xGPP1c8rnc+sXPrum9IjOOB9euXafMDI8G/DFHedU5Grg4qEHPZ5NLZODioAYuDiq0JFu5eT75sz0a+FxQg17IZoZJzHDQX7I18JmgsrI86j/Up9DSztlavT4nZODioELV2bpxbkCef8vQtROzlPdSduy5aIP1OSEDnwsqf1mOrh2bJd9/eLR+fb0OHjyo1pYWfXLgAEkgLfv36+DBg5o8oUR+r6/3iszYI6tbVyuvy61BL2ZryOYcFTQEVdiUTS6RgsagChqCGrwlWzlDPcrMdqlgY1CFm2L3Wb0+J6SgMajC17KVvyEoX6ZL/W/1avDfs1XQEGSGic6wIajBm7M14Fm/XFf103WVmRryVnbsuWiD9TkhBRuDGvp2jn41PUsZV7vUvGd32jbEV7rKmeXyuTPS9v173CMziuzmZwMqaAgqVOtXXn2AXCKhOr9CtX7lNwYULHTLG3AptM6vvPWx+6xenxMSqvMrb0NAg9b45fG6lHNLhvKbAgrV+plhojOs9Su/IaCbHs+U66p++uV0rwpeC8SeizZYnxMSWudX4d+CurbUp4yrXXrv/XcViUTU0dGR9Oec9dWcO3dOkUhEM++bbm2RDVwc+w0urz6g/A1BconkrY/9EBRsCip7cIZ8QZfy6gLKfyV2n9Xrc0Ly1geU/2pQobUBeX0u5f7Wo4LXgrENDDNMbIb1ARU0BfXrJ7Pkuqqfrp3hU+Hrwdhz0Qbrc0Ly6gIa/Ea2rivLVMbVLr3/QexkBS4SkTijTygyh4UiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjONInNoKLLUzJAiMzlDisz8DCky0ygyh4YiS80MKTKTM6TIzM+QIjPNNkV283MBFTQGFarzxzbS5KIJ1fsVqvMrvymgYKFb3oBLoVq/8jbE7rN6fU5IqN6vvFcCGlTjl8frUs4tGcrfFFCozs8ME51hnV/5jQHd9ESmXFf10y+ne1Xwt0DsuWiD9TkhoVq/Cl8P6tpSH0V2mSwrMuMv6cdFFlDe+iC5REL1AYXqAspvCipYmCFfwKVQbUB5G2L3Wb0+JyRUH1DeK0ENqgnI43Mp9xaP8jfFnoPMMMEZ1gWU3xjUTU9kql+8yIKx56IN1ueEhGoDKnw9W9dRZJfNFkWW5fEq76+5GvpGfxVuzNHgxlxyiRQ25KhwY46GbM5V/9/45M/1qPDVHA1uit1n9fqckMKGHA3elKuC9TnK8nt0zf9kasiWXBVuzGGGic5wY46GvJGrgX8OynN1hq6v9Gvom7mx56IN1ueEFL6ao99s7a8bpgfk+3ePdjd/lLYN8ZWuqrxCWR5v2r5/j4cW166pUabbo8D1Gcoe6FH2zZ7YV3Lx3BxLziCPMv0Z8nncnbNjhonPcKBH2QM88rndygpmKGdQ52wtX58T8sNzMHi9R96fuuX/T49yQswv6RmGPPJfkyHvT9264brrNDgvX/mDQiSJDCkoVJbHq8wMT+8VWTQalSQdPnxYUyZN0ri7ijX2TnI5GXd3scaNsX4dTs64McUaN9r6dTg2I4s1rrhYY0fZYC0OzbhRsRmOLLpDdwwfoTtHFOmO4SNIArlzRJHuHFGkMaNG64nHHu+9IgMAwEkuWmThcJgQQggxlUgkktaTZHosMs7MAQCkQjgcTuv377HIHntkkdra2tL64ACAK99Df/yTvv3227R9/x6LbFpZmT777LO0PTAAoG+YNKFEJ0+eTNv37/F9ZLMqq7T7o9j7JowzGQEASMbp06dVdm+pzp49m7bH6PF9ZAsXLNBrm16TxOtlAIDkGDtAhw4d0vRp96X1sXrcI1tXs1bPPPWUpPS/UAcAuLIYXfL3LVv04Pz5aX2sHl8j++STg5p6zxRJHFoEACTH2AF6+KGFemX9hrQ+VrdFZhTX5JKJOtB6QNFolDIDACQsGo2qvb1dd48arePHj6f1sbotMmOXcMP6DZpx33RJUkdHR1oXAgC4Mhh9sXL5Cv3xwQclpfdcix4PLRp7YSXjx2tTY1N8ceyZAQC6E41G4yV26NAhDfvdbTp27Fjae+OiRSZJX3/9tX7337fqtU2butxvXHKktxMOh9XR0UFIr8W4xE4yotEoz1ViSazaNp+vtbVVt97yW727a1eXPkmXi15r0Xjwr776SsWj79bc2XP0cXOzOjo4zIi+6VKFFolEOGqBPuvwoUN6+oknVTRsuN57911JvfP2rUte/f78H8r6unpNKy3TlMmTVVVRqdmVVb2SWZVVml01S5Uzy1VVUakH5s7T/Lnz9AAhacr88/Lcn5/V9m3b4j8HPf1gnn/7x83NWlq9RA/OfyD+/az+fyJXbuLPr3nzdf/sOZ3bzV7cRpdOvVf3TJykvzz/QvzNz731HuSEPsblwt8wjx87rn379mnf3lj27t2b9uzbu0979uzRrp07tWP7Du3Yvv2Hr4SkL9vefkerV61S5cxyjR1TrL/9cJGAC38mjB/Y5t27VTplqu4r+4OWVFfrra1bLf9/IH0hse3hrp07tWfPnl7dLhuPdeSLL7r9megNSX0eWTgc5rAJ+qzPPv1M48YUa9HDD0vq/EE1vtbX1WnYbbfrnbfftmyNgNWsuIDGZX+wpnFWY2/HqhcySd+N8ZlKhnunTNXzzz0nqfM047e2btWw227XqX+dkqT4f2f12knfi1XbZit3cviEaCBBxkYiHA7rzqIiNTc3KxqN6uSJkxp+++/1xeexQytc0g3oXRQZkIRIJHYYcds721Q6Zaok6c9PP6Onn3xSEiUGWIEiA5JkHEIpGT9eBz85qCmTJqutrY3XjwGLUGRAkoy9rqVLlmj6H6bFL8FDkQHWoMiAJBmHF/d8vEfBTL/W1ayVxGFFwCoUGXCZTp44qRx/QNu3bZfEB9ACVqHIgMsUDod1y9DfqGX/fkkcWgSsQpEBJvzXkKE60HpAEkUGWIUiA0xYsWy5jra1Wb0MoE+jyAAAjkaRAUkyLpUm/fgED074AHofRQYAcDSKDEiQsbf18ooVKhk3Pn7BYOOCqaf+9S+NGTVKtevWdfnzANKLIgMSFL+iR3W1fK4MHTt2TFLnFfAXLlggr8sd/1wmzmIEegdFBiTI2MPauWOHsjxe7f7oI0mxwjra1iafO0PPPPV0lz8LIP0oMiBBxh7WPw8flqefS02NjfH7qsor9PP+P9PZs2fZEwN6GUUGJKm9vV0BX6aeeuIJRaNRHT50SN5+bq1csUISe2NAb6PIgMtQGMrTtNIySbGPcxlww43xD94E0LsoMiAJxt7WqJEjVTJ+gtra2uR1ubWpsanL/QB6D0UGJME4c3H+3HkaPXKk7p81W4PzCyRxliJgFYoMSIJRZC+vXKmf9++va3Jy9dbWrZLYGwOsQpEBSej8UM2P5XNnaHzxWEnsjQFWosiAJBh7ZFs2b5G3n0v79+2TxN4YYCWKDEjQ+XtdgwbcrHsmTpJEiQFWo8iABJw7dy7+z/fPmq0cf0BHjx6NX2cRgHUoMuAijJJqbWnR0MLBGvjrAbrp+hv0/nvvdbkfgHUoMiAB3333nRobGrSpqUmnT5+WRIkBdkGRAQAcjSIDADgaRQYAcDSKDADgaBQZAMDRKDIAgKNRZAAAR6PIAACORpEBAByNIgMAOBpFBgBwNIoMAOBoFBkAwNH+Hwk3C7/4DGohAAAAAElFTkSuQmCC[/img]

Example: This year, there was 40% more snow than last year.[i][br]The amount of snow this year is 140% of the amount of snow last year.[/i][br][br][br]This year, there were 25% fewer sunny days than last year.

Compared to last month, there was a 50% increase in the number of houses sold this month.[br]

The runner’s time to complete the marathon was a 10% less than the time to complete the last marathon.[br]

The graph shows the relationship between the diameter and the circumference of a circle with the point [math]\left(1,\pi\right)[/math]shown. Find 3 more points that are on the line.[br][img]data:image/png;base64,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[/img]

Priya bought [math]x[/math] grams of flour. Clare bought [math]\frac{3}{8}[/math] more than that. Select [b]all[/b] equations that represent the relationship between the amount of flour that Priya bought, [math]x[/math], and the amount of flour that Clare bought, [math]y[/math].