The distinction between the Ornithischian and Saurischian dinosaurs is based on the ____

Estimate the distance traveled using 100 km per degree of longitude and latitude. How far did Sandy travel from 00 UTC on the 27th to 00 UTC on the 28th? 00 UTC on the 28th to 00 UTC on the 29th? 00 UTC on the 29th to 00 UTC on the 30th?

What will be an ideal response?

How are weather observations shared and distributed among different nations?

Which of the following best matches the description?Burning of fuel to obtain heat.

A. potential energy B. nucleus C. respiration D. entropy E. photosynthesis F. electron G. base H. enzyme I. pH J. kinetic energy K. combustion L. isotope M. neutron N. latent heat O. acid P. ion Q. proton

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